U.S. patent application number 10/261201 was filed with the patent office on 2004-04-01 for process for predicting porosity and permeability of a coal bed.
Invention is credited to Gunter, William Daniel, Mavor, Matthew John.
Application Number | 20040060351 10/261201 |
Document ID | / |
Family ID | 32029902 |
Filed Date | 2004-04-01 |
United States Patent
Application |
20040060351 |
Kind Code |
A1 |
Gunter, William Daniel ; et
al. |
April 1, 2004 |
Process for predicting porosity and permeability of a coal bed
Abstract
A method for predicting the secondary porosity system (SPS)
porosity, and thereby permeability; of a coal bed involves
determining an initial condition in the coal bed, including an
initial SPS pressure and an initial sorbed gas composition,
determining a pressure strain effect due to increasing the SPS
pressure to a value greater than the initial SPS pressure, and
determining a sorption strain effect due to changes in the sorbed
gas composition resulting from decreasing the methane content and
increasing the content of a stronger adsorbing fluid (SAG) relative
to the initial sorbed gas composition. Preferably, the method uses
data from test injections of water and/or a weaker adsorbing fluid
(WAG) and a SAG. The data is used in the inventors' model to
compute a SPS porosity and an absolute permeability at a reference
SPS pressure and a reference sorbed gas composition. Preferably,
the reference pressure is atmospheric pressure. The inventors'
model accounts for both dynamic pressure strain and dynamic
multicomponent sorption strain effects. As a result, a calibrated
model can be produced for the coal bed for predicting the coal
bed's SPS porosity, and thereby permeability, as a function of a
pre-selected injection or production fluid's composition and/or SPS
pressure conditions.
Inventors: |
Gunter, William Daniel;
(Edmonton, CA) ; Mavor, Matthew John; (Park City,
UT) |
Correspondence
Address: |
VAN TASSEL AND ASSOCIATES
POST OFFICE BOX 2928
BELLAIRE
TX
77402-2928
US
|
Family ID: |
32029902 |
Appl. No.: |
10/261201 |
Filed: |
September 30, 2002 |
Current U.S.
Class: |
73/152.05 ;
73/38 |
Current CPC
Class: |
E21B 41/0064 20130101;
Y02C 20/40 20200801; G01N 15/08 20130101; Y02C 10/14 20130101; E21B
49/008 20130101; E21B 43/006 20130101 |
Class at
Publication: |
073/152.05 ;
073/038 |
International
Class: |
G01N 015/08; E21B
049/00 |
Claims
We claim:
1. A method for predicting a secondary porosity system porosity in
a coal bed, comprising the steps of: (a) determining an initial
condition in the coal bed, including an initial secondary porosity
system pressure and an initial sorbed gas composition having an
initial methane content; (b) determining a pressure strain effect
on the coal bed due to increasing the secondary porosity system
pressure to a value greater than the initial secondary porosity
system pressure; (c) determining a sorption strain effect on the
coal bed due to changes in the sorbed gas composition resulting
from decreasing the methane content and increasing the content of a
stronger adsorbing fluid (SAG) relative to the initial sorbed gas
composition; (d) selecting a reference secondary porosity system
pressure and a reference sorbed gas composition; (e) correlating
the initial condition, the pressure strain effect and the sorption
strain effect in a quantitative relationship to determine: (i) a
reference secondary porosity system porosity, (ii) a reference
absolute permeability, and (iii) reference characteristic sorption
strain parameters for at least methane and the SAG for the
reference secondary porosity system pressure and reference sorbed
gas composition; and (f) calculating the secondary porosity system
porosity for a pre-selected secondary porosity system pressure and
a pre-selected sorbed gas composition, using the quantitative
relationship and reference values determined in step (e).
2. The method of claim 1, wherein the quantitative relationship
includes a secondary porosity system porosity that is substantially
equal to the reference secondary porosity system porosity plus the
pressure strain effect plus the sorption strain effect.
3. The method of claim 2, wherein the quantitative relationship is:
40 ref = 1 + ( p - p ref ) ref M + 1 ref ( 1 - K M ) ( ref - ) k a
k a - ref = ( ref ) 3 v where .phi. secondary porosity system
porosity at pressure p, dimensionless .phi..sub.ref secondary
porosity system porosity at reference pressure and reference sorbed
gas composition, dimensionless p.sub.ref reference pressure, psia p
secondary porosity system pressure, psia M constrained axial
modulus, psi .epsilon. total multicomponent volumetric sorption
strain at pressure p, dimensionless .epsilon..sub.ref total
multicomponent volumetric sorption strain at reference pressure and
reference sorbed gas composition, dimensionless K bulk modulus, psi
k.sub.a absolute permeability at pressure p, md k.sub.a-ref
absolute permeability at reference pressure and reference sorbed
gas composition, md.
4. The method of claim 1, wherein the reference secondary porosity
system pressure is atmospheric pressure and the reference sorbed
gas composition has 0% methane and 0% SAG.
5. The method of claim 1, further comprising the step of
calculating the absolute permeability for the secondary porosity
system porosity calculated in step (f), using the quantitative
relationship and the reference values determined in step (e).
6. A method for calculating a secondary porosity system porosity in
a coal bed having an in-situ sorbed gas composition, the method
comprising the steps of: (a) performing at least three independent
field tests, c.sub.1, c.sub.2 and C.sub.3, on the coal bed
comprising an initial-condition field test, an injection field test
using an injection fluid selected from the group consisting of
water and a weaker adsorbing fluid (WAG), and a production field
test using a stronger adsorbing fluid (SAG), where test results
from each of c.sub.1, c.sub.2 and c.sub.3 include at least: (i)
secondary porosity system pressure, (ii) absolute permeability, and
(iii) sorbed gas composition; (b) correlating the test results from
each of c.sub.1, c.sub.2 and c.sub.3 in a quantitative relationship
to determine: (i) a reference secondary porosity system porosity,
(ii) a reference absolute permeability, and (iii) reference
characteristic sorption strain parameters for at least methane and
a SAG, for a reference secondary porosity system pressure and a
reference sorbed gas composition; and (c) calculating the secondary
porosity system porosity for a pre-selected secondary porosity
system pressure and a pre-selected sorbed gas composition, using
the quantitative relationship and the reference values determined
in step (b).
7. The method of claim 6, wherein the injection fluid is water.
8. The method of claim 7, further comprising a second injection
field test using WAG as the injection fluid.
9. The method of claim 6, wherein one or both of the pre-selected
secondary porosity system pressure and pre-selected sorbed gas
composition is different from the secondary porosity system
pressures and sorbed gas compositions in step (a).
10. The method of claim 6, wherein the quantitative relationship
includes a secondary porosity system porosity that is substantially
equal to the reference secondary porosity system porosity plus a
dynamic pressure strain component plus a dynamic multicomponent
sorption strain component.
11. The method of claim 6, wherein the number of field tests is at
least (n+1), where n is the number of major components in a
pre-selected sorbed gas composition.
12. The method of claim 10, wherein the quantitative relationship
is: 41 ref = 1 + ( p - p ref ) ref M + 1 ref ( 1 - K M ) ( ref - )
k a k a - ref = ( ref ) 3 where .phi. secondary porosity system
porosity at pressure p, dimensionless .phi..sub.ref secondary
porosity system porosity at reference pressure and reference sorbed
gas composition, dimensionless p.sub.ref reference pressure, psia p
secondary porosity system pressure, psia M constrained axial
modulus, psi .epsilon. total multicomponent volumetric sorption
strain at pressure p, dimensionless .epsilon..sub.ref total
multicomponent volumetric sorption strain at reference pressure and
reference sorbed gas composition, dimensionless K bulk modulus, psi
k.sub.a absolute permeability at pressure p, md k.sub.a-ref
absolute permeability at reference pressure and reference sorbed
gas composition, md.
13. The method of claim 6, wherein the reference pressure is
atmospheric pressure and the reference sorbed gas composition has
0% methane and 0% SAG.
14. The method of claim 6, further comprising the step. of
calculating the absolute permeability for the secondary porosity
system porosity calculated in step (c), using the quantitative
relationship and the reference values determined in step (b).
15. A method for predicting secondary porosity system porosity of a
coal bed, comprising the steps of: (a) in test 1, determining an
initial absolute permeability, k.sub.a-i, at an initial secondary
porosity system pressure, p.sub.1, and a test 1 free gas
composition; (b) in test 2, injecting an injection fluid selected
from the group consisting of water and a weaker adsorbing fluid
(WAG) into the coal bed and determining an injection absolute
permeability, k.sub.a-2, at an injection secondary porosity system
pressure, p.sub.2, and a test 2 free gas composition; (c) in test
3, injecting a stronger adsorbing fluid (SAG) into the coal bed,
producing gas from the coal bed and determining a SAG production
absolute permeability, k.sub.a-3, at a SAG production secondary
porosity system pressure, p.sub.3, and a test 3 free gas
composition; (d) determining a sorbed gas composition corresponding
to each of the free gas compositions in steps (a), (b) and (c); (e)
producing values for total multicomponent volumetric sorption
strain, .epsilon..sub.1, .epsilon..sub.2, and .epsilon..sub.3, and
total multicomponent volumetric sorption strain at atmospheric
pressure, .epsilon..sub.atm-1, .epsilon..sub.atm-2, and
.epsilon..sub.atm-3, for each sorbed gas composition in step (d);
(f) solving Equations (1) and (2) for a secondary porosity system
porosity at atmospheric pressure, .phi..sub.atm, an absolute
permeability at atmospheric pressure, k.sub.a-atm, and
characteristic sorption strain parameters using secondary porosity
system pressures p.sub.1, p.sub.2 and p.sub.3, absolute
permeability values k.sub.a-1, k.sub.a-2 and k.sub.a-3 and total
multicomponent volumetric sorption strain, .epsilon..sub.1,
.epsilon..sub.atm-1, .epsilon..sub.2, .epsilon..sub.atm-2,
.epsilon..sub.3, and .epsilon..sub.atm-3, from step (e): 42 c atm =
1 + ( p c - p atm ) atm M + 1 atm ( 1 - K M ) ( atm - c - c ) ( 1 )
k a - c k a - atm = ( c atm ) 3 ( 2 ) where .phi..sub.c secondary
porosity system porosity at pressure p.sub.c, dimensionless
.phi..sub.atm secondary porosity system porosity at atmospheric
pressure, dimensionless p.sub.atm atmospheric pressure, psia
p.sub.c secondary porosity system pressure, psia M constrained
axial modulus, psi .epsilon..sub.c total multicomponent volumetric
sorption strain at pressure p.sub.c, dimensionless
.epsilon..sub.atm-c total multicomponent volumetric sorption strain
at atmospheric pressure, dimensionless K bulk modulus, psi c test
number 1, 2, 3, . . . c k.sub.a-c absolute permeability at pressure
p.sub.c, md k.sub.a-atm absolute permeability at atmospheric
pressure, md (g) calculating the secondary porosity system porosity
for a pre-selected secondary porosity system pressure and a
pre-selected sorbed gas composition, using Equation (1) and
.phi..sub.atm, k.sub.a-atm and the characteristic sorption strain
parameters determined in step (f).
16. The method of claim 15, further comprising the step of
calculating the absolute permeability for the secondary porosity
system porosity calculated in step (g), using Equation (2) and the
values for .phi..sub.atm and k.sub.a-atm determined in step
(f).
17. The method of claim 15, wherein the fluid injected in step (b)
is a water and the water injection free gas composition is the same
as the initial free gas composition.
18. The method of claim 17, further comprising the step of
repeating step (b) using WAG as the injection fluid.
19. The method of claim 18, further comprising the step of
repeating step (b) using a different WAG as the injection
fluid.
20. The method of claim 15, wherein the fluid injected in step (b)
is WAG and the WAG injection free gas composition is determined by
producing gas from the coal bed after injecting WAG.
21. The method of claim 20, further comprising the step of, in test
4, determining a WAG production absolute permeability, k.sub.a-4,
at a WAG production secondary porosity system pressure, p.sub.4,
and WAG production free gas composition, and conducting steps (d)
through (f) for test 4.
22. The method of claim 15, further comprising the step of, in test
5, determining a SAG injection absolute permeability, k.sub.a-5, at
a SAG injection secondary porosity system pressure, p.sub.5, and a
SAG injection free gas composition, and conducting steps (d)
through (f) for test 5.
23. The method of claim 15, further comprising the step of
repeating step (c) for a different SAG.
24. The method of claim 15, wherein the number of field tests is at
least (n+1), where n is the number of major components in a
pre-selected sorbed gas composition.
25. The method of claim 15, wherein the solving step (f) includes
providing an initial value for a first .phi..sub.c1 for one of the
tests 1, 2 or 3, having an absolute permeability k.sub.a-c1, and
determining a second .phi..sub.c2 for another of the tests 1, 2 or
3, having an absolute permeability k.sub.a-c2, according to: 43 c2
= c1 ( k a - c2 k a - c1 ) 1 3 .
26. The method of claim 25, wherein the solving step (f) further
includes determining a total multicomponent volumetric sorption
strain difference, (.epsilon..sub.c1-.epsilon..sub.c2), for
.phi..sub.c1 and .phi..sub.c2 at their respective secondary
porosity system pressures, p.sub.c1 and p.sub.c2, according to: 44
c1 - c2 = c2 - c1 + p c1 - p c2 M 1 - K M .
27. The method of claim 26, wherein the solving step (f) further
includes determining characteristic sorption strain parameters from
the total multicomponent volumetric sorption strain difference.
28. The method of claim 15, wherein Equation (1) further comprises
a temperature strain component.
29. The method of claim 15, wherein the injection fluid in step (b)
and the SAG are injected into the same well.
30. The method of claim 15, wherein the injection fluid in step (b)
is injected into a first well and the SAG is injected into a second
well.
31. The method of claim 15, further comprising the step of
determining water saturation at atmospheric pressure, S.sub.w-atm,
according to equation (30) after a value for .phi..sub.atm is
determined in step (f): 45 S w = S w - atm atm ( 30 ) where S.sub.w
water saturation, dimensionless S.sub.w-atm water saturation at
atmospheric pressure, dimensionless
32. A well-test procedure for predicting a coal bed's secondary
porosity system porosity, the coal bed having at least one
injection means comprising a wellbore and at least one producing
means that can communicate with at least a portion of the
formation, comprising the steps of: (a) determining an initial
absolute permeability, k.sub.a-1, of a coal bed at an initial
secondary porosity system pressure and an initial free gas
composition; (b) injecting a first injection fluid into the at
least one injection means at a pressure greater than the initial
secondary porosity system pressure and determining an injection
absolute permeability, k.sub.a-2, at an injection secondary
porosity system pressure, p.sub.2; (c) shutting in the at least one
injection means; (d) injecting a second injection fluid having a
different sorption capacity than the first injection fluid into the
at least one injection means at a pressure greater than the initial
secondary porosity system pressure; (e) shutting in the at least
one injection means; (f) producing fluid from the coal bed through
the at least one producing means and determining a production
absolute permeability, k.sub.a-3, at a production secondary
porosity system pressure, p.sub.3; (g) obtaining production data
for the fluid produced in step (f); (h) determining the coal bed's
secondary porosity system porosity and absolute permeability at a
reference secondary porosity system pressure and a reference sorbed
gas composition, using data from steps (a), (b), (f) and (g); and
(i) estimating the coal bed's secondary porosity system porosity
for a pre-selected secondary porosity system pressure and a
pre-selected sorbed gas composition; wherein at least one of the
first and second injection fluids is selected from the group
consisting of water and a fluid comprising at least about 70%
(vol.) weaker adsorbing fluid (WAG) and the other of the first and
second injection fluids comprises at least about 70% (vol.) of a
stronger adsorbing fluid (SAG).
33. The well-test procedure of claim 32, wherein the reference
secondary porosity system pressure is atmospheric pressure and
.phi..sub.atm is determined by solving Equations (1) and (2): 46
atm = 1 + ( p - p atm ) atm M + 1 atm ( 1 - K M ) ( atm - ) ( 1 ) k
a k a - atm = ( atm ) 3 ( 2 ) where .phi. secondary porosity system
porosity at pressure p, dimensionless .phi..sub.atm secondary
porosity system porosity at atmospheric pressure, dimensionless
p.sub.atm atmospheric pressure, psia p secondary porosity system
pressure, psia M constrained axial modulus, psi .epsilon. total
multicomponent volumetric sorption strain at pressure p,
dimensionless .epsilon..sub.atm total multicomponent volumetric
sorption strain at atmospheric pressure, dimensionless K bulk
modulus, psi k.sub.a absolute permeability at secondary porosity
system pressure, md k.sub.a-atm absolute permeability at
atmospheric pressure, md.
34. The well-test procedure of claim 33, wherein Equation (1)
further comprises a temperature strain component.
35. The well-test procedure of claim 32, wherein the first
injection fluid is selected from the group consisting of water and
a fluid comprising at least about 70% (vol.) WAG.
36. The well-test procedure of claim 35, wherein step (c) further
comprises the steps of producing fluid from the coal bed through
the at least one producing means; and obtaining production data for
the produced fluid.
37. The well-test procedure of claim 32, wherein the first
injection fluid is water.
38. The well-test procedure of claim 37, further comprising the
step of injecting WAG into the at least one injection means at a
pressure greater than the initial secondary porosity system
pressure and determining a second injection absolute permeability,
k.sub.a-2a, at a second injection secondary porosity system
pressure, p.sub.2a; shutting in the at least one injection means;
producing fluid from the coal bed through the at least one
producing means; and obtaining production data for the produced
fluid.
39. The well-test procedure of claim 32, wherein the WAG is
selected from the group consisting of helium, hydrogen, nitrogen,
carbon monoxide, argon, and oxygen.
40. The well-test procedure of claim 32, further comprising the
steps of repeating steps (b) and (c) for a different WAG.
41. The well-test procedure of claim 32, wherein the production
data is selected from the group consisting of coal thickness,
bottom-hole temperature, bottom-hole pressure, surface pressure,
surface temperature, fluid production rate, free gas composition
and sorbed gas composition.
42. The well-test procedure of claim 32, wherein the number of
field tests is at least (n+1), where n is the number of major
components in a pre-selected sorbed gas composition.
43. The well-test procedure of claim 32, wherein the SAG is
selected from the group consisting of carbon dioxide, nitric oxide,
sulfur hexafluoride, hydrogen sulfide, sulfur dioxide, nitrogen
dioxide, sulfur trioxide, trichlorofluoromethane,
dichlorodifluoromethane, chlorotrifluoromethane,
tetrafluoromethane, dichloromonofluoromethane, fluoroform,
1,1,2-trichloro-1,2,2-trifluoroethane, dichlorotetrafluoroethane,
hexafluoroethane, chloropentafluoroethane, and combinations
thereof.
44. The well-test procedure of claim 32, further comprising the
steps of repeating steps (d) through (g) for a different SAG.
45. The well-test procedure of claim 32, further comprising the
step conducting a water injection test after step (g).
46. The well-test procedure of claim 32, wherein the shut-in time
in step (c) is in a range from about 0.5 t.sub.s-CBM to about 4
t.sub.S-CBM.
47. The well-test procedure of claim 32, wherein the shut-in time
in step (c) is in a range from about t.sub.S-CBM to about 2
t.sub.S-CBM.
48. The well-test procedure of claim 32, wherein the shut-in time
in step (e) is in a range from about 0.5 t.sub.S-CBM to about 4
t.sub.S-CBM.
49. The well-test procedure of claim 32, wherein the shut-in time
in step (e) is in a range from about t.sub.S-CBM to about 2
t.sub.S-CBM.
50. The well-test procedure of claim 32, wherein the shut-in time
in step (c)is in the range from about the injection time to 1.5
times the injection time.
51. The well-test procedure of claim 32, wherein the shut-in time
in step (e)is in the range from about the injection time to 1.5
times the injection time.
52. The well-test procedure of claim 38, wherein WAG is injected
for a time in a range from about 6 hours to about 30 days.
53. The well-test procedure of claim 37, wherein water is injected
for a time in a range from about 2 hours to about 24 hours.
54. The well-test procedure of claim 32, wherein SAG is injected
for a time in a range from about 6 hours to about 30 days.
Description
FIELD OF THE INVENTION
[0001] The present invention relates to the field of coalbed
methane and, in particular, to a method for predicting a coal bed's
porosity, and thereby a coal bed's permeability.
BACKGROUND OF THE INVENTION
[0002] Coalbed methane (CBM) has become a significant component of
U.S. natural gas supplies. CBM production increased to 2.9 Bscf/day
of gas supply in 1997, accounting for about 6% of total U.S.
natural gas production (Stevens et al., "Enhanced Coalbed Methane
Recovery using CO.sub.2 Injection: Worldwide Resource and CO.sub.2
Sequestration Potential" SPE 48881; 1998).
[0003] Most CBM reservoirs are produced under primary recovery
methods, i.e., without secondary recovery methods involving
injection of recovery-enhancing fluids. The proportion of original
gas-in-place that can be recovered is dependent on reservoir
properties, in particular, the absolute permeability of the coal
bed. In high permeability reservoirs (>20 millidarcy (md)),
recovery can theoretically be up to 80% of original gas-in-place.
CBM recovery in moderate permeability reservoirs (5 to 20 md) can
range from 50 to 70%, while recovery in low permeability reservoirs
(.ltoreq.5 md) can range from 10 to 50%. CBM recovery is also
dependent on production economics. Presently, low permeability
reservoirs are unlikely to produce CBM at commercial rates without
some form of enhanced recovery. Moreover, the volume of CBM
remaining after primary production, especially in moderate and low
permeability reservoirs, is significant. For example, it is
estimated that primary production in developed areas of the San
Juan Basin alone, which are generally high permeability reservoirs,
may leave behind as much as 10 Tscf of natural gas in areas with
depleted coal beds (Stevens et al., ibid).
[0004] New technologies have been proposed for enhanced coalbed
methane recovery (ECBM) to recover a larger fraction of CBM in
place. The two principal variants of ECBM are (1) inert gas
stripping by injecting nitrogen (N.sub.2), which is a weaker
adsorbing gas (WAG) than methane (CH.sub.4), and (2) displacement
desorption by injecting carbon dioxide (CO.sub.2), a stronger
adsorbing gas (SAG) than CH.sub.4.
[0005] Generally, as an injected WAG enters a coal bed through a
wellbore, the partial pressure observed for CBM in the vicinity of
the wellbore is substantially reduced. Most significantly, it is
believed that the CBM partial pressure in the wellbore vicinity can
be reduced to particularly low levels as a WAG is injected.
Consequently, it is believed that as the CBM partial pressure is
reduced, the CBM desorption rate from coal increases dramatically
and the CBM is swept substantially through the coal bed in a
mixture with the WAG to a production well. The production rate of
the WAG and CBM is controlled by the total pressure in the
formation, which is maintained as high as possible by injection
during this process. Some WAG is sorbed into the coal, but there is
a net reduction in the total gas (i.e., CBM and WAG) content of the
coal.
[0006] By contrast, generally, as a gas that is more strongly
adsorbing than CH.sub.4 is injected into the coal bed, it is
believed to be preferentially adsorbed into the coal. Since the
SAGs are generally not produced, this process works well for both
ECBM recovery and sequestration of SAGs, such as CO.sub.2 or
hydrogen sulfide (H.sub.2S). And there is a net increase in the
total gas (i.e., SAG and CBM) content of the coal. Also, the SAG is
typically trapped in-situ and is not produced unless the injected
SAG front reaches the production well (i.e., breakthrough). At
breakthrough, this type of SAG injection and CBM displacement
process would be terminated.
[0007] Thus, a secondary benefit associated with a SAG
injection/CBM displacement process, such as a CO.sub.2-ECBM
process, is that it can sequester large volumes of CO.sub.2. There
is an increasing concern that some gaseous effluent streams from
industrial processes may cause environmental problems, and, as a
result, these streams should not be released into the atmosphere.
CO.sub.2 is a constituent of many gaseous effluent streams released
from industrial processes and whose release into the atmosphere is
causing increasing concern. Should global restrictions on CO.sub.2
emissions be promulgated, CO.sub.2-ECBM could be one of the few
profitable technologies for sequestering CO.sub.2. For instance,
tradable credits for CO.sub.2 sequestration could dramatically
improve CO.sub.2-ECBM economics over current performance
levels.
[0008] Some global warming proponents relate excess nitrous oxide
(N.sub.2O), as well as CO.sub.2, emissions to climatological
change. Also, nitrogen oxide (NO.sub.x) emissions, such as nitric
oxide (NO) or nitrogen dioxide (NO.sub.2), in sufficient
concentration, can be toxic to health and the environment.
Additionally, sulfur oxide (SO.sub.x) emissions, in sufficient
concentration, can contribute to the production of "acid rain,"
which can have a detrimental effect on various plant and aquatic
life.
[0009] Thus, it is possible that many or all of these gases could
become more stringently regulated, at least in certain
market-developed countries or regions, such as the United States,
Canada, Japan and Europe. Consequently, this prospect of increasing
regulatory stringency for some or all gaseous emissions can hamper
many industries because the combustion of virtually any hydrocarbon
fuel with air produces an effluent containing CO.sub.2, N.sub.2,
and gaseous combustion products.
[0010] For instance, various countries, including, among others,
France, Germany, the United Kingdom, Canada and Japan have agreed
to seek internal approval and adoption, within their respective
jurisdictions, of the Kyoto Protocol. The Kyoto Protocol ensued
from the United Nations Framework Convention on Climate Change,
held in December 1997 at Kyoto, Japan. Under the Kyoto Protocol,
each participant agreed in principle to "implement and/or further
elaborate policies and measures in accordance with its national
circumstances" to, among other things, enhance energy efficiency
and protect reservoirs of certain atmospheric gases not controlled
by the Montreal Protocol (e.g., CO.sub.2). Generally, the Kyoto
Protocol addressed emissions of greenhouse gases, including
CO.sub.2, CH.sub.4, N.sub.2O, hydrofluorocarbons (HFCs),
perfluorocarbons (PFCs), and sulfur hexafluoride (SF.sub.6). While
the United States and Australia have elected not to follow the
Kyoto Protocol, they tend to address greenhouse gas emissions with
national programs.
[0011] In addition to being a hydrocarbon combustion product,
CO.sub.2can be produced by natural processes and released to the
environment during a non-combustion process. For example, CO.sub.2
is produced by thermal and biogenic processes, which are believed
to form hydrocarbons such as oil, natural gas, or coal. CO.sub.2
often is recovered with these hydrocarbons and released to the
atmosphere by various post-production steps.
[0012] The increasing concern over the atmospheric release of
CO.sub.2 and other undesired gas-emission compounds demands a
method(s) for disposing of the compounds, once collected.
[0013] As discussed above, various ECBM recovery and sequestration
processes have been disclosed. For example, U.S. Pat. No. 6,412,559
(Gunter, Mavor and Law, Jul. 2, 2002) describes a process for
recovering CH.sub.4 from a coal bed and/or sequestering a SAG in a
coal bed by cyclic SAG injection with intervening shut-in
periods.
[0014] In order to make injection and/or production processes more
efficient, it is desirable to determine the coal bed's porosity,
absolute permeability and effective permeability to gas and water
for a given injection pressure, production pressure, injected gas
composition and/or produced gas composition. These data would then
be used to design, monitor, and improve the efficiency of ECBM
and/or sequestration processes. These data can also be used to
design, monitor and improve the efficiency of primary production
processes.
[0015] Coal is characterized by two distinct porosity systems,
discussed more fully below: a primary porosity system and a
secondary porosity system ("SPS"). The primary porosity system
contains the vast majority of the gas-in-place and the
sequestration capacity, while the SPS provides the conduit for mass
transfer between wells and the primary porosity system.
[0016] Primary porosity system gas storage is dominated by
adsorption phenomena because of the high surface area to volume
ratio caused by very small pore spaces within the organic material
and the close proximity of gas molecules to molecules within solid
materials. The gas and solid molecules attract each other due to
weak intermolecular forces known as Van der Waals forces. Due to
attraction to the solid, gas molecules are packed closer together
than expected from the pressure and temperature conditions. The
equivalent density of the molecules in the sorbed state is similar
to the density of the molecules in a liquid state. In coal beds,
the primary porosity system is relatively impermeable due to the
small pore sizes. Mass transfer for each gas molecular species is
dominated by diffusion that is driven by the concentration gradient
(i.e., change in concentration along a flow path divided by the
length of the flow path) for each molecular species.
[0017] Commercially productive CBM reservoirs contain a
well-developed SPS. Without natural fractures, commercial
production from CBM reservoirs would not be possible due to the low
permeability of the primary porosity system. Flow through the SPS
is due to pressure gradients through the fracture system towards
production wells.
[0018] Gray ("Reservoir Engineering in Coal Seams: Part 1--The
Physical Process of Gas Storage and Movement in Coal Seams" SPE
12514, 1987) recognized that coal permeability changes during
production due to (1) phase relative permeability effects (i.e.,
degree of saturation affects gas and water relative permeabilities)
and (2) changes in effective stress within the coal seam.
Generally, Gray observed that permeability is a function of
effective stress within the coal seam. So, when the coal matrix
shrinks with gas desorption, a concomitant decrease in effective
stress leads to increased permeability. On the other hand, when
coal bed cleats close with reduced fluid pressure, a concomitant
increase in effective stress leads to decreased permeability. More
specifically then, Gray teaches that permeability decreases when
fluid pressure is reduced (i.e., coal bed cleats close). On the
other hand, he observes an opposing effect where permeability is
increased when coal shrinkage occurs with gas desorption.
[0019] Later, Stevenson et al. ("Adsorption/Desorption of
Multicomponent Gas Mixtures at In-Seam Conditions" SPE 23026, 1991)
produced adsorption isotherms for binary and ternary mixtures of
CO.sub.2, CH.sub.4 and/or N.sub.2. The adsorption isotherms showed
that equilibrium gas (free gas) and adsorbate phase (sorbed gas)
compositions differ considerably. Accordingly, Stevenson et al.
teach that the total amount of gas adsorbed strongly depends on a
gas mixture's composition and the system pressure.
[0020] And Arri et al. ("Modeling Coalbed Methane Production with
Binary Gas Sorption" SPE 24363, 1992) described multi-component gas
sorption using extended Langmuir isotherms as the basis for
equilibrium between free and sorbed gas.
[0021] In the mid-1990's, those skilled in the art recognized that
a significant feature of coal is its ability to sorb substances,
including gases and stimulation chemicals. Upon sorption, the coal
matrix swells and closes natural fractures, thereby reducing
natural fracture permeability. Likewise, when a gas that is more
weakly adsorbing than the in-situ gas is injected into the
formation, the coal matrix will shrink, as weaker adsorbing fluid
displaces the stronger adsorbing fluid from the coal matrix.
Consequently, matrix shrinkage and swelling affect the coal bed's
SPS porosity, absolute permeability and effective permeability to
gas and water.
[0022] However, coal beds are most frequently heterogeneous and may
exhibit significant anisotropy in both the vertical and horizontal
directions. Also, coal is often found in layers separated by shale
or sandstone. Therefore, core samples frequently fail to provide
reliable estimates of a coal bed's in-situ SPS porosity or
permeability. Likewise, pressure fall-off tests on their own
typically yield insufficient information to sufficiently
characterize a coal bed.
[0023] Accordingly, those skilled in the art have endeavored to
produce a model for calculating SPS porosity and/or permeability.
As an example, Levine developed a rock mechanics model to evaluate
the effect of matrix shrinkage on fracture aperture width and
absolute permeability as fluid pressure declines during primary CBM
production ("Model Study of the Influence of Matrix Shrinkage on
Absolute Permeability of Coal bed Reservoirs," Gayer, R. and
Harris, I. eds., Coalbed Methane and Coal Geology Geological
Society Special Publication No. 109, The Geological Society,
London, pg. 197-212; 1996).
[0024] Levine recognized that absolute permeability could increase
during primary production due to coal matrix shrinkage resulting
from CBM desorption. But, citing Gray (ibid), Levine also
recognized that, without matrix shrinkage, fractures could be
sealed due to increasing pore volume compressibility with
decreasing fluid pressure. Levine's model covered the relationship
between gas desorption strain and fluid pressure decrease during
CBM production. More specifically, Levine's CBM production model
assumed a curvilinear relationship between sorption strain and
pressure during production. The model also used the Langmuir
isotherm model for determining CH.sub.4 and CO.sub.2 data. Fracture
width changes during primary production were modeled by Levine
using five relationships: 1 p = ( max P 50 ) ( P 50 + P ) 2 k = (
1.013 .times. 10 9 ) b 3 12 s p = 1 E ( 1 - 2 v ) P f
.epsilon..sub.sM.sub.s.multidot..DELTA.P.sub.f
b.sub.2=b.sub.1+.epsilon..sub.p.multidot.s+.epsilon..sub.s.multidot.s
[0025] where
[0026] .epsilon..sub.max theoretical maximum strain at infinite
pressure
[0027] P.sub.50 pressure at 50% of maximum strain
[0028] P pressure
[0029] k permeability
[0030] b fracture width
[0031] s fracture spacing
[0032] .epsilon..sub.p fracture closure strain due to pressure
change
[0033] E Young's modulus
[0034] .nu. Poisson's ratio
[0035] P.sub.f pressure of fluids residing within coal
[0036] .epsilon..sub.s matrix shrinkage coefficient
[0037] M.sub.s matrix shrinkage coefficient
[0038] b.sub.2 new fracture width
[0039] b.sub.1 previous fracture width
[0040] Levine selected "base case" and ranges of values for
b.sub.1, E, .nu., s, .epsilon..sub.max and P.sub.50 and conducted
parameter sensitivity analyses to show the effect of each variable.
In each case, one of the six variables was changed while the
remaining variables were held constant at the "base case" value.
Although Levine acknowledges that there are interrelationships
between the variables, there is no suggestion on how to account for
the interrelationships. For example, Levine's sensitivity analysis
showed that "permeability should increase more for coals with a
higher Young's modulus; however, coals with a higher Young's
modulus will tend to have a correspondingly lower matrix shrinkage
coefficient as well and would probably actually exhibit a smaller
increase in permeability." (Levine, p. 211)
[0041] Although Levine recognized parameter sensitivity in
predicting permeability, including the sorption effect of CO.sub.2
over CBM, he did not provide guidance on how to use each equation
to predict a specific absolute permeability value for a specific
reservoir condition. Levine's analysis also did not account for
effects by or on injection processes. Accordingly, Levine's model
was limited to primary production cases.
[0042] Recognizing some of the limitations of Levine's model,
Palmer and Mansoori ("How Permeability Depends on Stress and Pore
Pressure in Coalbeds: A New Model" SPE 36737; 1996 and SPE 52607;
1998) developed a theoretical model for calculating pore volume
compressibility and permeability, during primary production, as a
function of effective stress and matrix shrinkage. The theoretical
model was intended to be more rigorous than the Levine model. The
Palmer & Mansoori Model ("P&M Model") is presented below: 2
0 = 1 + c m 0 ( P - P 0 ) + c 0 0 ( K M - 1 ) ( bP 1 + bP - bP 0 1
+ bP 0 ) ( P & M Model )
[0043] where
[0044] .phi. porosity
[0045] .phi..sub.0 porosity at original reservoir pressure
[0046] P reservoir pressure
[0047] P.sub.0 original reservoir pressure
[0048] c.sub.m matrix compressibility, psi.sup.-1
[0049] c.sub.0, b parameters of Langmuir curve match to volumetric
strain change due to matrix shrinkage
[0050] K bulk modulus
[0051] M constrained axial modulus
[0052] But again the P&M Model was limited to predicting strain
effects during primary production, without accounting for strain
effects arising with gas injection or changes in gas composition.
Palmer & Mansoori also identified the following relationship
between permeability and porosity: 3 k k 0 = ( 0 ) 3
[0053] where
[0054] k permeability
[0055] k.sub.0 virgin permeability
[0056] For convenience, hereinafter, we will refer to the portion
of any model that accounts for porosity changes arising from
pressure changes as pressure strain. Meanwhile, we will refer to
the portion of the model that accounts for porosity changes arising
from gas content changes as sorption strain.
[0057] Mavor et al. ("Increasing Coal Absolute Permeability in the
San Juan Basin Fruitland Formation" SPE 39105; 1998) used the
P&M Model to match the pressure and production behavior of
three wells completed in Fruitland Formation coal seams in the San
Juan Basin of Colorado. Primary CBM production resulted in coal
seam permeability increases of 2.1 to 7.1 times the original
permeability. Well tests were conducted in three wells early in the
life of the well and later after significant depletion had
occurred. The P&M Model was calibrated with the data from one
well. The calibrated model was then used to compute the expected
permeability ratio as a function of the pressure ratio. The
computed relationship matched the results for the other two wells
without additional changes. This analysis confirmed that the
P&M Model was applicable to a primary CBM production and that
the cubed power of the porosity ratio used to quantify the
relationship between coal bed permeability and SPS porosity was
correct.
[0058] The P&M Model accounts for changes in SPS porosity when
pressure is reduced and when the coal matrix shrinks as the volume
of gas sorbed into the coal matrix declines during production.
[0059] However, while the P&M Model accounts for coal matrix
shrinkage, it is only applicable for a constant (i.e., static) gas
composition. Moreover, the P&M Model is used to predict how
permeability changes as pressure is decreased in drawdown, but not
during injection. According to Palmer & Mansoori, "During
drawdown of a reservoir by primary production, effective stress
increases and permeability decreases due to cleat compression.
However in coalbeds, drawdown leads to desorption of methane, and
this is accompanied by matrix shrinkage which opens the cleats and
leads to permeability increase. The two effects of cleat
compression and matrix shrinkage act in opposite directions on
permeability."
[0060] Accordingly, the P&M Model accounts only for changes in
permeability and porosity during production, in particular during
primary production. Because primary production does not involve
injecting other gases, as in the case of ECBM recovery techniques,
the produced gas composition is relatively constant until late in
the life of a reservoir. And because the P&M Model assumes a
constant gas composition, it is applicable only to production of
original in-situ gas composition.
[0061] However, in ECBM recovery and/or fluid sequestration
projects, the produced and/or injected gas compositions are
dramatically different from the original in-situ composition. Such
changes also affect the strain parameters dramatically.
Accordingly, the P&M Model is not useful for predicting
permeability or porosity changes in ECBM or fluid sequestration
projects where gas other than original in-situ CBM is produced
and/or injected into the coal bed. Also, the P&M Model uses
initial coal bed reservoir properties as a reference point for
determining the extent of change in reservoir permeability.
However, after a fluid is injected or produced, the reservoir
properties at the initial reservoir pressure have changed even if
the reservoir pressure is substantially the same. Accordingly, the
P&M Model becomes less effective, if not inapplicable, for
predicting changes in permeability or porosity due to fluid
injection or production with changing gas composition. These same
disadvantages also apply to the less rigorous Levine model.
[0062] As an alternative approach to determining reservoir
permeability, among other reservoir properties, such as CBM
recovery rate and %CBM that can be economically recovered, Puri in
U.S. Pat. No. 5,501,273 (Mar. 26, 1996) and a 1995 conference paper
by Puri et al. ("A Micro-Pilot Approach to Coalbed Methane
Reservoir Assessment," Intergas '95 Proceedings, University of
Alabama/Tuscaloosa, pp. 265-274, May 15-19, 1995) describes a
method using field data obtained from an injection flow-back test,
which data, in turn, is used in a numerical reservoir simulator,
along with injection data and any prior primary production data, to
model the coal bed reservoir. More specifically, Puri's method is
particularly suited for predicting CBM recovery rate and % CBM
recovered in an ECBM recovery process. Meanwhile, the
injection/flow-back test involves injecting a gaseous desorbing
fluid containing at least 50% (vol.) N.sub.2 into a formation.
Injection rate data is collected during the injection step. The
wellbore is then shut-in and the pressure response is measured. In
a subsequent flow-back step, at least a portion of the injected
fluid is produced, while production rate data and produced fluid
composition data are obtained. Then, the collected field data is
used in conjunction with reservoir modeling techniques, preferably
by history matching with a numerical reservoir simulator for
modeling the formation so ECBM recovery characteristics can be
determined.
[0063] Puri teaches that the injection rate increase obtained for a
given increase in injection pressure is dependent on the stress
dependent permeability relationship exhibited by the formation. As
defined by Puri, the stress-dependent permeability relationship
describes the change in the effective permeability that occurs in
the formation as the pore pressure changes. Puri further teaches
that as injection pressure increases, pore pressure increases,
which, in turn, causes the effective permeability of the formation
to increase. Accordingly, Puri considers only changes in
permeability arising from fluid pressure changes, such as a drop in
fluid pressure that leads to cleat closure, and hence, reduced
permeability for the SPS. But Puri fails to account for coal matrix
shrinkage or swelling arising from the effects of different gases
on the coal matrix.
[0064] For instance, the relationship between the effective
permeability ratio, K.sub.f/K.sub.i,, and pore pressure is
illustrated in Puri's FIG. 1, (U.S. Pat. No. 5,501,273) which
compares a theoretical relationship based on laboratory data (curve
25), history matching coal seam behavior before and during air
injection (curve 27) and history matching coal seam behavior during
flow-back after air injection (curve 29).
[0065] In fact, in 1991, Puri et al. published the theoretical
relationship between Kf and Ki, which was later re-introduced in
FIG. 1 of U.S. Pat. No. 5,501,273 as curve 25 (see "Measurement of
Stress Dependent Permeability in Coals and its Influence on Coalbed
Methane Production" Paper 9142 Proceedings of the 1991 Coalbed
Methane Symposium, University of Alabama/Tuscaloosa; May 13-16,
1991). The theoretical relationship is based on absolute
permeability measurements performed on a coal sample maintained
under uniaxial strain conditions to simulate an overburden with
constant axial stress. The testing avoided relative permeability
effects, as the coal sample was saturated with brine and then
depleted of brine while maintaining a constant axial confining
stress.
[0066] But, since the coal sample contained no gas, the theoretical
relationship cannot account for changes in permeability arising
from gas content changes. In fact, when comparing the
history-matched and theoretical K.sub.f/K.sub.i relationships in
FIG. 1 of his patent, Puri stated that "The discrepancy between
theoretical curve 25 and fitted curve 27 during the pre-injection
production and air injection period is believed to be a result of
the simulator not accounting for the relative permeability
relationship exhibited over time by the formation."(col. 21:4-8).
Therefore, Puri fails to recognize the importance of, and thereby
account for, a sorption strain component to better predict the coal
bed's permeability in view of different types of injection gas
compositions.
[0067] Moreover, Puri suggests that his method for determining ECBM
recovery characteristics using a test gas containing at least 50%
(vol.) N.sub.2 could equally be applied to ECBM recovery techniques
using an injected gaseous desorbing fluid containing either at
least 50% (vol.) N.sub.2 or at least 50% (vol.) CO.sub.2. And yet
Puri does not account for matrix shrinkage or swelling due to gas
composition. However, as discussed more fully below, N.sub.2 and
CO.sub.2 have quite different effects on a coal bed's permeability
and porosity.
[0068] Accordingly, there is a need for a method for predicting a
coal bed's SPS porosity and/or permeability for different injected
and/or produced fluid compositions at different injection and/or
production pressures. Moreover, there is a need for a model that
can be applied to injection and/or production processes. More
particularly, there is a need for a method for predicting a coal
bed's SPS porosity and/or permeability for better assessing the
economics and efficiency of both CBM production and/or
sequestration projects.
SUMMARY OF THE INVENTION
[0069] According to the present invention, there is provided a
method for predicting a secondary porosity system (SPS) porosity in
a coal bed, comprising the steps of:
[0070] (a) determining an initial condition in the coal bed,
including an initial SPS pressure and an initial sorbed gas
composition having an initial CH.sub.4 content;
[0071] (b) determining a pressure strain effect on the coal bed due
to increasing the SPS pressure to a value greater than the initial
SPS pressure;
[0072] (c) determining a sorption strain effect on the coal bed due
to changes in the sorbed gas composition resulting from decreasing
the CH.sub.4 content and increasing the content of a SAG relative
to the initial sorbed gas composition;
[0073] (d) selecting a reference SPS pressure and a reference
sorbed gas composition;
[0074] (e) correlating the initial condition, the pressure strain
effect and the sorption strain effect in a quantitative
relationship to determine:
[0075] (i) a reference SPS porosity,
[0076] (ii) a reference absolute permeability, and
[0077] (iii) reference characteristic sorption strain parameters
for at least CH.sub.4 and SAG for the reference SPS pressure and
reference sorbed gas composition; and
[0078] (f) calculating the SPS porosity for a pre-selected SPS
pressure and a pre-selected sorbed gas composition using the
quantitative relationship and reference values determined in step
(e).
[0079] According to the present invention, there is also provided a
method for calculating a SPS porosity in a coal bed having an
in-situ sorbed gas composition, the method comprising the steps
of:
[0080] (a) performing at least three independent field tests,
c.sub.1, c.sub.2 and C.sub.3, on the coal bed comprising an
initial-condition field test, an injection field test using an
injection fluid selected from the group consisting of water and a
WAG, and a production field test using a SAG, where test results
from each of c.sub.1, c.sub.2 and c.sub.3 include at least:
[0081] (i) SPS pressure,
[0082] (ii) absolute permeability, and
[0083] (iii) sorbed gas composition;
[0084] (b) correlating the test results from each of c.sub.1,
c.sub.2 and c.sub.3 in a quantitative relationship to
determine:
[0085] (i) a reference SPS porosity,
[0086] (ii) a reference absolute permeability, and
[0087] (iii) reference characteristic sorption strain parameters
for at least CH.sub.4 and SAG, for a reference SPS pressure and a
reference sorbed gas composition; and
[0088] (c) calculating the SPS porosity for a pre-selected SPS
pressure and a pre-selected sorbed gas composition, using the
quantitative relationship and the reference values determined in
step (b).
[0089] According to the present invention, there is further
provided a method for predicting SPS porosity of a coal bed,
comprising the steps of:
[0090] (a) in test 1, determining an initial absolute permeability,
k.sub.a-1, at an initial SPS pressure, p.sub.2, and a test 1 free
gas composition;
[0091] (b) in test 2, injecting an injection fluid selected from
the group consisting of water and a WAG into the coal bed and
determining an injection absolute permeability, k.sub.a-2, at an
injection SPS pressure, P.sub.2, and a test 2 free gas
composition;
[0092] (c) in test 3, injecting a SAG into the coal bed, producing
gas from the coal bed and determining a SAG production absolute
permeability, k.sub.a-3, at a SAG production SPS pressure, p.sub.3,
and a test 3 free gas composition;
[0093] (d) determining a sorbed gas composition corresponding to
each of the free gas compositions in steps (a), (b) and (c);
[0094] (e) producing values for total multicomponent volumetric
sorption strain, .epsilon..sub.1, .epsilon..sub.2, and
.epsilon..sub.3, and total multicomponent volumetric sorption
strain at atmospheric pressure, .epsilon..sub.atm-1,
.epsilon..sub.atm-2, and .epsilon..sub.atm-3, for each sorbed gas
composition in step (d);
[0095] (f) solving Equations (1) and (2) for a SPS porosity at
atmospheric pressure, .phi..sub.atm, an absolute permeability at
atmospheric pressure, k.sub.a-atm, and characteristic sorption
strain parameters using SPS pressures p.sub.1, p.sub.2 and p.sub.3,
absolute permeability values k.sub.a-1, k.sub.a-2 and k,3 and total
multicomponent volumetric sorption strain, .epsilon..sub.1,
.epsilon..sub.atm-1, .epsilon..sub.2, .epsilon..sub.atm-2,
.epsilon..sub.3, and .epsilon..sub.atm-3, from step (e): 4 c a t m
= 1 + ( p c - p a t m ) a t m M + 1 a t m ( 1 - K M ) ( a t m - c -
c ) ( 1 ) k a - c k a - a t m = ( c a t m ) 3 ( 2 )
[0096] where
[0097] .phi..sub.c SPS porosity at pressure p.sub.c,
dimensionless
[0098] .phi..sub.atm SPS porosity at atmospheric pressure,
dimensionless
[0099] p.sub.atm atmospheric pressure, psia
[0100] p.sub.c SPS pressure, psia
[0101] M constrained axial modulus, psi
[0102] .epsilon..sub.c total multicomponent volumetric sorption
strain at pressure Pc, dimensionless
[0103] .epsilon..sub.atm-c total multicomponent volumetric sorption
strain at atmospheric pressure, dimensionless
[0104] K bulk modulus, psi
[0105] c test number 1, 2, 3, . . . c
[0106] k.sub.a-c absolute permeability at pressure p.sub.c, md
[0107] k.sub.a-atm absolute permeability at atmospheric pressure,
md
[0108] (g) calculating the SPS porosity for a pre-selected SPS
pressure and a pre-selected sorbed gas composition, using Equation
(1) and .phi..sub.atm, k.sub.a-atm and the characteristic sorption
strain parameters determined in step (f).
[0109] According to the present invention, there is also provided a
well-test procedure for predicting a coal bed's SPS porosity, the
coal bed having at least one injection means comprising a wellbore
and at least one producing means that can communicate with at least
a portion of the formation, comprising the steps of:
[0110] (a) determining an initial absolute permeability, k.sub.a-1,
of a coal bed at an initial SPS pressure and an initial free gas
composition;
[0111] (b) injecting a first injection fluid into the at least one
injection means at a pressure greater than the initial SPS pressure
and determining an injection absolute permeability, k.sub.k-2, at
an injection SPS pressure, P.sub.2;
[0112] (c) shutting in the at least one injection means;
[0113] (d) injecting a second injection fluid having a different
sorption capacity than the first injection fluid into the at least
one injection means at a pressure greater than the initial SPS
pressure;
[0114] (e) shutting in the at least one injection means;
[0115] (f) producing fluid from the coal bed through the at least
one producing means and determining a production absolute
permeability, k.sub.a-3, at a production SPS pressure, p.sub.3;
[0116] (g) obtaining production data for the fluid produced in step
(f);
[0117] (h) determining the coal bed's SPS porosity and absolute
permeability at a reference SPS pressure and a reference sorbed gas
composition, using data from steps (a), (b), (f) and (g); and
[0118] (i) estimating the coal bed's SPS porosity for a
pre-selected SPS pressure and a pre-selected sorbed gas
composition;
[0119] wherein at least one of the first and second injection
fluids is selected from the group consisting of water and a fluid
comprising at least about 70% (vol.) WAG and the other of the first
and second injection fluids comprises at least about 70% (vol.) of
a SAG.
BRIEF DESCRIPTION OF THE DRAWINGS
[0120] The process of the present invention will be better
understood by referring to the following detailed description of
preferred embodiments and the drawings referenced therein, in
which:
[0121] FIG. 1A is a graphical illustration of a hypothetical
example illustrating the contribution of dynamic pressure strain
and dynamic multicomponent sorption strain components of Equation
(1) to normalized porosity resulting from injecting a sorbing
gas.
[0122] FIG. 1B is a graphical illustration of the FIG. 1A example
illustrating the effect of secondary porosity system ("SPS")
pressure on a normalized SPS porosity, .phi., computed with
Equation (1) and a normalized absolute permeability, k.sub.a,
computed with Equation (2);
[0123] FIG. 2 is a graphical illustration of one example of the
relationship between k.sub.a, effective permeability to gas,
k.sub.eg, effective permeability to water, k.sub.ew, and SPS
pressure;
[0124] FIG. 3 is a graphical illustration of the relationship
between water saturation, S.sub.w, relative permeability to gas,
k.sub.rg, relative permeability to water, k.sub.rw, and SPS
pressure for the same example illustrated in FIG. 2;
[0125] FIG. 4 is redrawn from Gash et al. ("The Effects of Cleat
Orientation and Confining Measurement on Cleat Porosity,
Permeability and Relative Permeability in Coal," Paper 9321,
Proceedings of the 1993 International Coalbed Methane Symposium The
University of Alabama/Tuscaloosa; May 17-21; 1993) illustrating the
relationship between k.sub.rg, k.sub.rw, and S.sub.w;
[0126] FIG. 5 is a graphical illustration of the relationship
between k.sub.a and .phi. as a function of SPS pressure for well
FBV 4A in Example 1;
[0127] FIG. 6 is a graphical illustration of the relationship
between k.sub.a and .phi. as a function of SPS pressure for well
FBV 5 in Example 1; and
[0128] FIG. 7 is a graphical illustration of sorption strain for
CO.sub.2, CH.sub.4 and N.sub.2 as a function of SPS pressure for
Example 1.
DETAILED DESCRIPTION OF THE PREFERRED EMBODIMENTS
[0129] For convenience, the nomenclature used in the Detailed
Description and claims is summarized in Table 13 at the end of the
Detailed Description.
[0130] Definitions
[0131] "Coal" is a combustible rock, containing more than about 50%
by weight carbonaceous material, formed by compaction and
induration of plant matter. Coal is classified by type (kinds of
plant matter), rank (degree of metamorphism) and grade (degree of
impurity). Coal also contains minerals, typically clay minerals,
such as kaolinite and montmorillonite. Higher coal ranks tend to
have greater amounts of associated CH.sub.4. Accordingly, coal
comprises, without limitation, carbon, hydrogen, nitrogen, oxygen,
sulfur, phosphorus, silicon, calcium, magnesium and heavy
metals.
[0132] A "coal bed" or "coal seam" is a stratum or layer of
coal.
[0133] A "coal bed formation" refers to a body of strata containing
coal beds and typically one or more other strata including, without
limitation, clay, shale, carbonaceous shale, sandstone and other
inorganic rock types. While a coal bed formation generally contains
organic matter, at any one location the thickness of organic matter
present can vary from almost none to nearly 100% of the formation
thickness.
[0134] "Coalbed methane" (CBM), also known as "coal gas," is a
natural gas consisting of CH.sub.4, lesser amounts of ethane,
propane and higher hydrocarbons, and inorganic gases, such as
CO.sub.2 and N.sub.2. CBM may be present in a free state, sorbed
state and/or in solution with water or liquid hydrocarbons. Free
gas stored by compression (i.e., dictated by pressure and
temperature conditions) may be present in both the primary and
secondary porosity systems (defined below), though to a lesser
degree than the sorbed gas. CBM solution gas dissolved in water
that may be present, if any, will typically be a smaller percentage
than sorbed CBM present in the coal bed.
[0135] "Free gas" is a gas whose volumetric properties can be
estimated with an equation of state such as the Real Gas Law,
pV=nzRT or the Peng-Robinson equation of state. Free gas is not
sorbed gas in the coal bed's secondary porosity system, although
the gas may have been or may become sorbed in the primary porosity
system. The composition of the free gas (i.e., the relative amounts
of each component in a free gas mixture) is dependent on its
equilibrium with sorbed gas in the primary porosity system and,
therefore, changes during injection and/or production. As used
herein, a produced gas is assumed to be representative of the free
gas composition.
[0136] "Sorbed Gas" is a gas contained within the micropores and
mesopores of the primary porosity system. Due to the small size of
the micropores and mesopores, there is a high surface area for
attracting gas molecules to the organic and mineral matter within
the primary porosity system. Due to the net attraction, the density
of the sorbed gas is believed to be greater than that of free gas
at the same temperature and pressure conditions. The volumetric
properties of sorbed gas cannot be accurately predicted with the
equations of state used for free gas. Gas contained within the
primary porosity system is treated as sorbed gas herein, although
it is recognized that there could be some free gas within the
primary porosity system.
[0137] "Sorption" refers to the general physical process where gas
molecules in close proximity to solid material molecules experience
a net attraction to the solid molecules. The term "sorption" as
used in this document also refers to "adsorption" and "desorption"
where the volume of sorbed gas increases and decreases,
respectively.
[0138] "Fluid" means a liquid, gas, finely divided solids and
combinations thereof that change shape or direction uniformly in
response to an external force imposed on it.
[0139] "Stronger adsorbing gases or fluids" (collectively referred
to herein as "SAG") are fluids having an atmospheric pressure
boiling point greater than that of CH.sub.4, i.e., greater than
-164.degree. C. Thus, as used herein, "weaker adsorbing gases or
fluids" (collectively referred to herein as "WAG") are fluids
having a boiling point less than that of CH.sub.4, i.e., lower than
-164.degree. C.
[0140] "Porosity" in general is the ratio of the pore volume
("V.sub.p", also referred to as void volume) within a material to
the bulk volume of the material. There are two major subtypes of
coal porosity, namely a primary porosity system and a secondary
porosity system, each having two principal porosity subtypes:
[0141] A "primary porosity system" is comprised of micropores and
mesopores resulting from natural coal-forming processes. Micropores
are pores having a diameter less than about 2 nanometers (nm)
(i.e., 2.times.10.sup.-9 m). Mesopore diameters are in the range of
from about 2 nm to about 50 nm. Isolated macropores can also form
part of the primary porosity system, but are not usually considered
a principal subtype of the primary porosity system. Isolated
macropores have diameters in the range of from about 50 nm to about
1 mm and are not connected to other macropores or natural fractures
(i.e., not substantially contributing to Darcy flow). Fluid
transfer in the primary porosity system is primarily by diffusion,
which usually obeys Fick's Law.
[0142] A "secondary porosity system" (for brevity, "SPS") is
comprised of interconnected macropores in the range of from about
50 nm to about 1 mm, and natural fractures that are generally less
than about 1 mm in width. Natural fractures include cleats and
joints, defined below. For purposes of the discussion herein,
non-propped induced fractures can also form part of the SPS.
Generally, the SPS provides the conduit for mass transfer to wells,
by Darcy flow (i.e., fluid flow under a pressure gradient).
[0143] "Permeability" ("k") is a rock property that quantifies the
ability of a porous rock to transmit fluids through the rock due to
a pressure gradient, which is the change in pressure along a flow
path divided by the length of the flow path. Permeability is
typically determined from pressure data, for example using core
samples, and calculated from Darcy's Law based on pressure
gradients, fluid properties and flow geometry. Increased
permeability results in greater flow rates for a given pressure
gradient. There are three different terms used to describe
permeability: absolute, effective and relative.
[0144] "Absolute permeability" ("k.sub.a") is the permeability that
is determined when only one fluid is present in the coal. Typical
commercial CBM reservoirs have an absolute permeability in the
range of from about 1 to 25 md, but some CBM reservoirs may have an
absolute permeability as great as about 600 md. Absolute
permeability can be determined by a method like that described in
Chapter 5 of Gas Research Institute Report GRI-94/0397 (Mavor, M.
and Saulsberry, J. L. "Testing Coalbed Methane Wells" in A Guide to
Coalbed Methane Reservoir Engineering March 1996).
[0145] "Effective permeability" ("k.sub.e") is the permeability of
one fluid in the presence of one or more other fluids. If two
different fluid phases are present, the vapor phase interferes with
the liquid phase and vice versa. Two immiscible liquid phases
(e.g., water and oil) can also interfere with each other.
Accordingly, due to a fluid/fluid interference, the effective
permeability is less than the absolute permeability. In coal, which
has both gas and water present, the effective permeability is a
function of gas and water saturation in the secondary porosity
system. Effective permeability can be determined by a method like
that described in Johnson et al. ("Calculation of Relative
Permeability from Displacement Experiments" Trans. AIME
216:370-372; 1959).
[0146] "Relative permeability" ("k.sub.r") is the effective
permeability divided by the absolute permeability.
[0147] "Effective conductivity" is a measure of the ability of a
fluid to flow through a porous rock of given thickness.
Accordingly, the effective conductivity to gas is the
multiplication product of the effective permeability of gas
("k.sub.eg") and the thickness of the porous rock. Likewise, the
effective conductivity to water is the multiplication product of
the effective permeability of water ("k.sub.ew") and the thickness
of the porous rock.
[0148] "Water saturation," S.sub.w, is the ratio between the water
volume, V.sub.w, and the pore volume, V.sub.p (also referred to as
void volume), in the SPS. "Gas saturation" is the ratio between the
gas volume and V.sub.p in the SPS.
[0149] "Impermeable" rock is a rock of such low permeability that
it has little or no effect upon the fluid flow in adjacent
permeable rock.
[0150] "Secondary porosity system compressibility" is the
fractional change in SPS pore volume per unit pressure change in
the SPS. For brevity, secondary porosity system compressibility
will be referred to herein as "fracture compressibility," even
though the SPS, as defined above, can also include interconnected
macropores as well as fractures.
[0151] "Matrix compressibility" is the fractional change in coal
matrix bulk volume per unit change in the pressure imposed on the
coal matrix. The coal matrix includes, among other things, the
primary porosity system, solid material and water, and is bounded
by the SPS.
[0152] "Cleats" are natural fractures in coal. Types of cleats
include, without limitation, face cleats, butt cleats, and tertiary
cleats. Face and butt cleats are the most common fractures observed
in CBM reservoirs. Face and butt cleats are generally orthogonal or
substantially orthogonal to each other and are generally
perpendicular to bedding surfaces. Shorter length butt cleats
commonly terminate in longer length face cleats. Tertiary cleats
commonly terminate in the face or butt cleats, indicating that they
were formed later in time: Tertiary cleats provide increased
connectivity between face and butt cleats and, thereby, increase
the overall permeability of the cleat system.
[0153] "Joints" are larger scale fractures with inter-fracture
spacing on the order of feet. Joints tend to have greater heights
than cleats and can cut across lithotypes and coal/inorganic rock
interbeds. Similar to tertiary cleats, joints can increase the
overall fracture system connectivity and permeability, but on a
much larger scale. Joints can also increase permeability in the
vertical direction.
[0154] "Induced fractures" are fractures that are created by
injecting or producing fluids into and/or from a coal bed. Induced
fractures also include natural fractures whose length has been
increased, with or without increasing the fracture's aperture.
[0155] "Fracture aperture" is the distance between the two coal
matrix planes bounding a fracture, i.e., width.
[0156] "Reservoir pressure" ("P.sub.R") means the average pressure
of a well's drainage area at a specified depth. The reservoir
pressure of the formation may change over time as fluids are
injected into the formation and/or fluids are produced from the
formation.
[0157] "Bottom-hole pressure" ("P.sub.W") means the pressure at the
same depth as the center point of the reservoir within the
wellbore. Bottom-hole and reservoir pressure are usually specified
at the same depth.
[0158] "Bottom-hole temperature" refers to the temperature at the
same depth as the center point of the reservoir within the
wellbore.
[0159] "Fracture extension pressure" ("P.sub.E") is the pressure
required to extend an existing induced fracture and/or cleat.
P.sub.E can change during an injection, for example, without
limitation, due to coal heterogeneity and pressure losses in an
induced fracture. Accordingly, P.sub.E is often indicated by a
pressure range.
[0160] "Fracture pressure" ("P.sub.F") is equal to the minimum
horizontal in-situ stress and is often referred to as closure
stress. P.sub.F is commonly interpreted to mean the pressure
required to initiate the opening of an existing natural or induced
fracture. P.sub.F is less than P.sub.E. Two reasons that P.sub.E is
greater than P.sub.F are, without limitation, (1) friction between
fracture surfaces and injected fluids and (2) fracture tip
toughness, i.e. the proclivity for a material to resist failure by
fracture extension.
[0161] "Volumetric strain" (".epsilon.") is a measure of
deformation presented as the change in volume divided by the
original volume. Since the total bulk volume of the coal bed is
substantially constant, a change in the SPS bulk volume (i.e., SPS
void volume) is substantially equal in magnitude, but opposite in
sign, to a change in the primary porosity system bulk volume (i.e.,
coal matrix volume). Accordingly, when the SPS bulk volume
increases, the coal matrix volume decreases by substantially the
same amount. And, when the coal matrix volume increases, the SPS
bulk volume decreases by substantially the same amount.
[0162] As used herein, "characteristic sorption strain parameters"
are the terms .epsilon..sub..infin.i and p.sub..epsilon.i, which
are substantially constant for a particular gas component in a
specified coal bed. The term .epsilon..sub..infin.i is the
characteristic volumetric sorption strain at infinite pressure for
component i in a multicomponent gas (dimensionless). And the term
p.sub..epsilon.i is the pressure at a sorption strain of 0.5
.epsilon..sub..infin.i for component i in a multicomponent gas
(psia). The terms can be used, for example, in Equation (4) to
determine the volumetric sorption strain for component i in a
multicomponent gas, which in turn can be used, for example, in
Equation (5) to determine the total multicomponent volumetric
sorption strain.
[0163] General Description
[0164] Generally, the inventors have discovered a method for
predicting the secondary porosity system ("SPS") porosity, , and
thereby permeability, of a coal bed. The method involves
determining an initial condition in the coal bed, including an
initial SPS pressure and an initial sorbed gas composition,
determining a pressure strain effect due to increasing the SPS
pressure to a value greater than the initial SPS pressure, and
determining a sorption strain effect due to changes in the sorbed
gas composition resulting from decreasing the CH.sub.4 content and
increasing the content of a stronger adsorbing fluid (SAG). The
initial condition, pressure strain effect and sorption strain
effect are correlated in a quantitative relationship to determine a
reference SPS porosity, a reference absolute permeability and
reference characteristic sorption strain parameters, at a reference
SPS pressure and reference sorbed gas composition.
[0165] Preferably, the method correlates data from at least three
test conditions including an initial condition, an injection
condition using water and/or a weaker adsorbing fluid (WAG), and a
production condition after injecting a stronger adsorbing fluid
(SAG).
[0166] Preferably, the reference pressure is atmospheric pressure,
at which pressure substantially no gas is sorbed to the coal
matrix. Accordingly, at atmospheric pressure the SPS porosity,
.phi..sub.atm, absolute permeability, k.sub.a-atm, and
characteristic sorption strain parameters are essentially
independent of gas composition. The values for .phi..sub.atm and
k.sub.a-atm, along with the characteristic sorption strain
parameters, can then be used to produce a calibrated model for a
particular coal bed. In turn, the calibrated model can be used to
predict the coal bed's .phi. and permeability as a function of a
pre-selected injection or production fluid's composition and/or SPS
pressure condition. For example, the calibrated model can be used
for a different injection and/or production fluid composition at a
SPS pressure used in one of the test conditions. Alternatively, the
calibrated model can be used for a test condition fluid composition
at a different injection and/or production SPS pressure. Or the
calibrated model can be used for predicting the coal bed's .phi.
and permeability for an injection and/or production fluid
composition or SPS pressure, different from the test condition
fluid compositions and SPS pressures. Preferably, the pre-selected
SPS pressure is less than fracture pressure.
[0167] Porosity Model
[0168] In general terms, the inventors' model for predicting the
SPS porosity under fluid injection and/or production conditions is
represented by the following relationship, where the SPS porosity
is a function of a reference SPS porosity, such as .phi..sub.atm: 5
[ SPS Porosity ] = [ Reference SPS Porosity ] + [ Dynamic Pressure
Strain ] + [ Dynamic Multicomponent Sorption Strain ]
[0169] Up to this point, others in the field of coal bed reservoir
modeling have neglected the effect on sorption strain due to
changes in (1) multicomponent free gas composition during
production or injection and (2) multicomponent sorbed gas
composition in the primary porosity system. Thus, others in the
field of coal bed reservoir modeling have neglected the interactive
and competing effects on SPS porosity arising from (a) dynamic
pressure strain, due substantially to pressure changes in the SPS,
and (b) dynamic multicomponent sorption strain, due substantially
to coal matrix swelling and shrinking, as fluids are being injected
and/or produced. More specifically, if considered at all, those
skilled in the art have assumed that the sorption strain component
is only dependent on the SPS pressure, while neglecting the effect
of the changing sorbed gas composition in the primary porosity
system (i.e., dynamic multicomponent sorption strain). Accordingly,
previous methods for predicting a coal bed's SPS porosity fail to
provide SPS porosity and, hence, permeability estimates, consistent
with actual field performance.
[0170] More specifically, one quantitative expression for
predicting SPS porosity, in view of these interactive and competing
effects, is represented by Equation (1), using atmospheric pressure
as the reference SPS pressure: 6 a t m = 1 + ( p - p a t m ) a t m
M + 1 a t m ( 1 - K M ) ( a t m - ) ( 1 )
[0171] where
[0172] .phi. secondary porosity system porosity at pressure p,
dimensionless
[0173] .phi..sub.atm secondary porosity system porosity at
atmospheric pressure, dimensionless
[0174] p.sub.atm atmospheric pressure, psia
[0175] p secondary porosity system pressure, psia
[0176] M constrained axial modulus, psi
[0177] .epsilon. total multicomponent volumetric sorption strain at
pressure p, dimensionless
[0178] .epsilon..sub.atm total multicomponent volumetric sorption
strain at atmospheric pressure, dimensionless
[0179] K bulk modulus, psi
[0180] The inventors' model shares certain attributes with the
P&M Model discussed above under Background of the Invention.
However, there are several significant differences and attributes
the inventors' model has over the P&M Model. Hence, as
discussed more fully below, the inventors' proposed model provides
significant advantages over the P&M Model as well as
others.
[0181] A relationship between k.sub.a and .phi. was previously
described by Palmer & Mansoori (ibid, discussed more fully
above) and revised by the present inventors in view of Equation
(1). The revised permeability/porosity relationship is presented in
Equation (2), again using atmospheric pressure as the reference SPS
pressure: 7 k a k a - a t m = ( a t m ) 3 ( 2 )
[0182] where
[0183] k.sub.a absolute permeability at secondary porosity system
pressure, md
[0184] k.sub.a-atm absolute permeability at atmospheric pressure,
md
[0185] As described mathematically in Equation (1), .phi. is
affected by two basic mechanisms, which inevitably interact with
each other to affect a fracture's aperture. One mechanism relates
to changing the pressure in the coal bed's SPS, which affects
pressure strain, while a second mechanism relates to the coal
matrix's ability to swell or shrink with gas adsorption or
desorption, respectively, which affects sorption strain. And, as
described by the porosity/permeability relationship in Equation
(2), k.sub.a is also affected by the same basic mechanisms.
[0186] For example, assuming a constant coal bed bulk volume, a net
1% change in the coal matrix volume, due to either pressure strain
and/or sorption strain, can change S, by a factor of 2 or more,
while the corresponding k.sub.a changes by a factor of 8 (i.e.,
2.sup.3) or more, in view of the porosity/permeability relationship
in Equation (2).
[0187] In Equation (1), the term [(p-p.sub.atm)/.phi..sub.atmM]
represents .phi. changes due to pressure strain. Hereinafter, this
term will be referred to as the "dynamic pressure strain
component." As used herein, pressure strain is a measure of the
change in SPS pore volume, relative to its volume at the reference
pressure, in this case, atmospheric pressure, due to changes in
pressure inside coal bed fractures. As the pressure in the SPS
increases, the fracture aperture can be increased, while reductions
in pressure result in reduced fracture aperture. The extent of
fracture aperture change per unit pressure change in the SPS is
substantially a function of the coal bed's fracture
compressibility, which in turn depends on the inherent properties
of the coal bed. In general, injecting gas balloons fractures and
compresses the coal matrix. Accordingly, because the overall
reservoir volume is constant, SPS pore volume increases and matrix
volume decreases. Therefore, other factors aside, increased SPS
pressure results in increased .phi. and increased k.sub.a.
[0188] Meanwhile, the term 8 [ 1 a t m ( 1 - K M ) ( a t m - )
]
[0189] in Equation (1) represents .phi. changes due to sorption
strain. Hereinafter, this term will be referred to as the "dynamic
multicomponent sorption strain component." As used herein, sorption
strain is a measure of the change in SPS pore volume, relative to
its volume at the reference pressure (and, as appropriate, the
reference gas composition), in this case atmospheric pressure, due
to coal matrix shrinking or swelling resulting substantially from
fluid (typically a gas) adsorption or desorption. Some fluids are
more strongly adsorbed to coal than CBM, causing the coal matrix to
swell more than it does when CBM is adsorbed to coal. Accordingly,
.phi. and k.sub.a are decreased by SAG sorption due to a net gain
in sorbed gas content with subsequent coal swelling. Meanwhile,
other fluids are less strongly sorbed than CBM. For less strongly
sorbed fluids, .phi. and k.sub.a are increased as CBM is desorbed,
for example, either by displacing with WAG or by primary
production.
[0190] Accordingly, in an injection and/or production process,
dynamic pressure strain and dynamic multicomponent sorption strain
are interactive in their effect on .phi. and permeability. For
example, a fluid injected into a coal bed will balloon fractures
and, depending on its chemical composition, will have a tendency to
be adsorbed into the coal matrix. Of course, SAGs have a greater
tendency to increase a coal matrix's swelling. But it is also
believed that adsorbed SAGs, such as CO.sub.2, can also weaken the
coal matrix as more SAG is adsorbed into the matrix. This weakening
makes the coal matrix more sensitive to pressure exerted on or
around (i.e., outside) the matrix, such as, for example, during
injection. The extent of aperture changes per unit pressure change
in the region outside the coal matrix will substantially be a
function of the coal bed's matrix compressibility, which depends on
the inherent properties of the coal bed in response to the type and
volume of SAG adsorbed in the coal matrix.
[0191] So, when injection is stopped, the pressure outside the coal
matrix decreases, which allows the swelling coal matrix to reduce
fracture apertures (i.e., the SPS becomes more constricted). But,
during injection periods, the increased SPS pressure inside the
fractures causes the fractures to balloon (i.e., the SPS expands).
Typically, this ballooning tends to overcome coal matrix swelling
by compressing portions of the matrix, so that the coal matrix
volume. is either restored substantially to its original volume or
reduced below its original volume. Consequently, despite periodic
swelling in the coal matrix, injection is still possible.
[0192] One way to view this interaction between dynamic pressure
strain effects versus dynamic multicomponent'sorption strain
effects on aperture size is by considering a ballooning expansion
and constriction process. A fracture in the SPS, which can be
envisioned as a "hot dog" type balloon with a high aspect ratio, is
surrounded by a substantially resilient solid material (i.e., coal
matrix). So, an increase in aperture size can be envisioned as
blowing a gas, such as SAG, into a "hot dog" type balloon. As the
pressure in the high aspect ratio balloon increases, the balloon
expands first at one end and then progressively along the balloon's
longitudinal axis (i.e., the fracture axis). This process can be
envisioned as expanding the fracture's aperture. Meanwhile, the
walls of the balloon apply a compression force on the surrounding
coal matrix, while gas is blown into the balloon, thereby
compressing the coal matrix and restricting the balloon's expansion
to some degree.
[0193] Because the walls of the balloon are fluid permeable, when
SAG is the injected gas, much of the SAG that permeates the balloon
is adsorbed by the coal matrix, which has a tendency to swell the
coal matrix depending upon the pressure inside the balloon. But,
when gas is no longer blown into the balloon, the gas leaks out of
the balloon, balloon pressure is reduced, and the compression force
on the coal matrix is reduced accordingly. The coal matrix will
swell, thereby constricting the balloon under lower pressure. As
the matrix continues to swell, the balloon constricts accordingly.
Finally, the balloon constricts to a volume smaller than its
original volume (i.e., the SPS becomes more constricted) and the
coal matrix's volume is larger due to swelling.
[0194] The effects of the dynamic pressure strain and dynamic
multicomponent sorption strain components of Equation (1) are
illustrated in a hypothetical example in FIGS. 1A and 1B. As shown
in FIG. 1A, if the dynamic pressure strain component is considered
alone when a fluid is injected into a coal bed, the volumetric
strain appears to follow a linear dependence on pressure. The
injected fluid balloons the fracture system at increased SPS
pressure, thereby compressing the coal matrix. Accordingly, when a
fluid is injected, volumetric strain due to dynamic pressure strain
alone is always greater than .phi. and increases linearly with
pressure along the line labeled "Dynamic Pressure Strain Component"
in FIG. 1A. When water is injected, the linear relationship between
total strain and SPS pressure is expected to follow the line
labeled "Dynamic Pressure Strain Component" with little, if any,
contribution from sorption strain effects.
[0195] Although pressure strain also influences the total
volumetric strain when sorbing fluids are injected, volumetric
strain is further affected by dynamic multicomponent sorption
strain. For example, CH.sub.4 and SAGs, such as CO.sub.2, are
sorbed to the coal matrix. The sorption process causes the matrix
to swell, so that the dynamic multicomponent sorption strain
component in Equation (1) will always be less than or equal to zero
for a SAG. Accordingly, when considering the dynamic multicomponent
sorption strain component alone, volumetric strain decreases with
increasing SPS pressure along the line labeled "Dynamic Sorption
Strain Component" in FIG. 1A. The degree to which the dynamic
multicomponent sorption strain component influences total
volumetric strain is dependent, in part, on how strongly the gas is
sorbed into the coal matrix.
[0196] When the dynamic pressure strain and dynamic multicomponent
sorption strain components are added in Equation (1), the
normalized SPS porosity, .phi./.phi..sub.atm , (1+dynamic pressure
strain+dynamic multicomponent sorption strain) for this
hypothetical example changes with SPS pressure along the line
labeled "Normalized Porosity" in FIG. 1B. The normalized
permeability based upon Equation (2) changes with SPS pressure
along the line labeled "Normalized Absolute Permeability" in FIG.
1B. As illustrated by the portion of each line below the value 1
(represented by a dashed line) in FIG. 1B, the dynamic
multicomponent sorption strain component of Equation (1) is more
dominant at lower pressures for adsorbing fluids. But, as the SPS
pressure increases, in this case above about 2,250 psia, the
dynamic pressure strain component of Equation (1) becomes more
dominant than the dynamic multicomponent sorption strain component
and the normalized SPS porosity of Equation (1), and hence the
normalized absolute permeability of Equation (2), becomes greater
than 1.
[0197] Thus, the normalized porosity model developed by the
inventors correlates the effects of dynamic pressure strain and
dynamic multicomponent sorption strain to calibrate a coal bed's
properties to SPS pressure for better predicting .phi. and k.sub.a
for pre-selected injection and/or production fluid compositions and
pressures.
[0198] As discussed above, the P&M Model also accounts for
changes in .phi. due to pressure strain and sorption strain.
However, also as discussed above, the primary limitations of the
P&M Model include: (1) assuming constant strain parameters, and
therefore static gas composition, and assuming strain parameters
and gas composition are the same as the original in-situ gas
composition, and (2) accounting only for changes in .phi. and
permeability during production. Because the gas composition in the
P&M Model is constant, it is applicable only to production of
original in-situ gas composition. Moreover, even if the P&M
Model was applied to an injection case, the injected gas
composition would have to be the same as the original in-situ gas
composition, e.g., where the produced gas is reinjected into the
reservoir. However, in ECBM recovery and fluid sequestration
projects, the injected and produced gas compositions can be
dramatically different from the original in-situ composition.
Another secondary disadvantage of the P&M Model is that the
initial reservoir properties are used as the reference point.
However, as discussed below, initial reservoir properties are a
function of the initial gas composition and the initial pressure.
Therefore, in order to effectively use the P&M Model reference
point, both a reference gas composition and reference pressure must
be accounted for. However, Palmer and Mansoori failed to account
for a reference gas composition.
[0199] In contrast, the inventors' model (1) accounts for changing
gas composition and, therefore, strain parameters, and (2) can be
applied to both injection and production. These two advantages of
the inventors' model are discussed more fully below. As a further
advantage over the P&M Model, the inventors' model preferably
uses atmospheric properties as reference properties.
[0200] Reference Reservoir Properties
[0201] Preferably, the inventors' model uses SPS porosity at
atmospheric pressure, .phi..sub.atm, as the reference porosity
because .phi..sub.atm, pressure strain and sorption strain for a
particular coal bed are essentially the same for all gas
compositions at atmospheric pressure. Specifically, at atmospheric
pressure, there is substantially no gas contained within the coal
matrix. Therefore, gas composition does not substantially affect
.phi..sub.atm and, hence, k.sub.a-atm. Accordingly, by correlating
.phi..sub.atm and k.sub.a-atm values for different test conditions,
the model can be calibrated and then Equations (1) and (2) can be
used to predict .phi. and permeability for a pre-selected injection
and/or production pressure and fluid composition.
[0202] Conversely, the P&M Model uses porosity at initial
reservoir pressure as a reference pressure. However, short term WAG
and SAG injections have different effects on SPS porosity even
though the reservoir pressure may not change appreciably.
Therefore, the P&M Model SPS porosity at initial reservoir
pressure may not be the same for all gas compositions.
[0203] Effects of Gas Composition
[0204] The sorption strain component of Equation (1) accounts for
coal matrix swelling and shrinkage due to fluid sorption and
composition. As discussed more fully above, the P&M Model
assumes a constant produced gas composition, which is a valid
assumption as long as changes in the produced gas composition are
relatively minor. However, in ECBM recovery projects and
sequestration projects where fluid is injected into the coal bed,
the P&M Model assumption is no longer valid because the in-situ
sorbed gas composition changes and porosity is affected by changes
in the sorption strain due to changes in sorbed gas composition.
Likewise, producing multi-component gases with different sorption
characteristics reduces the net gas content, and changes the sorbed
gas composition, thereby changing the sorption strain. Accordingly,
as discussed more fully below, the claimed method accounts for
sorption strain caused by different fluids, whether the in-situ
sorbed gas composition changes by injecting a substantially
constant gas composition or the injected or produced gas
composition changes with time.
[0205] It is known that strain-pressure relationships for a single
component gas can be fit with a Langmuir type equation as described
in Equation (3). See, for example, Levine, J. R. (ibid). 9 s =
.infin. s p p + p s ( 3 )
[0206] where
[0207] .epsilon..sub.s single component volumetric sorption strain,
dimensionless
[0208] .epsilon..sub..infin.s characteristic single component
volumetric sorption strain at infinite pressure, dimensionless
[0209] p SPS pressure, psia
[0210] p.sub..epsilon.s single component characteristic pressure at
a sorption strain of 0.5.epsilon..sub..infin.s, psia
[0211] The volumetric sorption strain for each component in a
multicomponent gas, caused by sorption at any composition and
pressure, can be computed with a relationship described in Equation
(4): 10 i = .infin. i p x i p i 1 + p j = 1 n x j p j ( 4 )
[0212] where
[0213] .epsilon..sub.i volumetric sorption strain for component i
in a multicomponent gas, dimensionless
[0214] .epsilon..sub..infin.i characteristic volumetric sorption
strain at infinite pressure for component i in a multicomponent
gas, dimensionless
[0215] p.sub..epsilon.i, p.sub..epsilon.j characteristic pressures
at a sorption strain of 0.5 .epsilon..sub..infin.i for components i
and j, respectively, in a multicomponent gas, psia
[0216] x.sub.i, x.sub.j mole fractions of components i and j,
respectively, in the sorbed gas phase, dimensionless
[0217] n number of components in multicomponent gas
[0218] p SPS pressure, psia
[0219] The total multicomponent volumetric sorption strain is
determined by summing the volumetric sorption strain due to each
gas species in Equation (4), according to Equation (5): 11 = i = 1
n i ( 5 )
[0220] where
[0221] .epsilon. total multicomponent volumetric sorption strain,
dimensionless
[0222] .epsilon..sub.i volumetric sorption strain component i in a
multicomponent gas, dimensionless
[0223] n number of components in multicomponent gas
[0224] The total multicomponent volumetric sorption strain
calculated in Equation (5) is subsequently used in Equation (1). In
this way, Equation (1) and the method described herein accounts for
different volumetric sorption strains caused by the swelling and
shrinkage effect of different fluids.
[0225] Adsorption
[0226] Different fluids shrink or swell the coal matrix relative to
CH.sub.4. Fluids that are more strongly adsorbed than CH.sub.4 are
referred to as stronger adsorbing fluids (SAG) and fluids that are
less strongly adsorbed than CH.sub.4 are referred to as weaker
adsorbing fluids (WAG).
[0227] One method for determining whether a fluid would be a SAG or
WAG is to compare the boiling point of the injection fluid relative
to CH.sub.4. The atmospheric pressure boiling point is believed to
be a generally reliable indicator of the relative strength of fluid
adsorption in a coal bed, i.e., the higher the boiling point, the
greater the adsorption strength. For illustrative purposes,
atmospheric pressure boiling points for a number of compounds of
potential interest are listed in Table 1.
1TABLE 1 Atmospheric Pressure Boiling Relative Component Point
(.degree. C.) Strength 1,1,2-trichloro-1,2,2-trifluoroethane 47.6
(CCl.sub.2FCClF.sub.2) Sulfur Trioxide (SO.sub.3) 44.8
Trichlorofluoromethane (CCl.sub.3F) 23.7 Nitrogen Dioxide
(NO.sub.2) 21.2 Dichloromonofluoromethane (CHCl.sub.2F) 8.9
Dichlorotetrafluoroethane (CClF.sub.2CClF.sub.2) 3.6 Sulfur Dioxide
(SO.sub.2) -10 Dichlorodifluoromethane (CCl.sub.2F.sub.2) -29.8
Chloropentafluoroethane (CClF.sub.2CF.sub.3) -37.7 Propane
(C.sub.3H.sub.8) -42.1 Hydrogen Sulfide (H.sub.2S) -60.7 Sulfur
Hexafluoride (SF.sub.6) -63.8 Hexafluoroethane (CF.sub.3CH.sub.3)
-78.2 Carbon Dioxide (CO.sub.2) -78.5 Chlorotrifluoromethane
(CClF.sub.3) -81.4 Fluoroform (CHF.sub.3) -84 Nitrous Oxide
(N.sub.2O) -88.5 Ethane (C.sub.2H.sub.6) -88.6 .Arrow-up bold.
Xenon (Xe) -107.1 Stronger Tetrafluoromethane (CF.sub.4) -128
Adsorbing Nitric Oxide (NO) -151.8 Fluids (SAG) Methane (CH.sub.4)
-164 Methane Oxygen (O.sub.2) -183.0 Weaker Argon (Ar) -185.7
Adsorbing Carbon Monoxide (CO) -191.5 Fluids (WAG) Nitrogen
(N.sub.2) -195.8 .dwnarw. Hydrogen (H.sub.2) -252.8 Helium (He)
-268.9
[0228] As used herein, fluids with atmospheric boiling points less
than that of CH.sub.4, i.e. less than about -164.degree. C., are
believed to be weaker adsorbing fluids (WAGs), while those with
atmospheric boiling points greater than that of CH.sub.4, i.e.
greater than about -164.degree. C., are believed to be stronger
adsorbing fluids (SAGs). For example, helium is considered
substantially non-adsorbing in coal and it has the lowest boiling
point of the compounds listed in Table 1.
[0229] In general, the sorption capacity of coal increases with
pressure, depth and coal rank. For example, for a given depth and a
similar reservoir pressure, anthracite generally has a greater
sorption capacity than low-volatile bituminous coal, which, in
turn, has a greater sorption capacity than medium-volatile
bituminous coal and high-volatile bituminous coal.
[0230] CO.sub.2 reduces the absolute permeability of a coal bed by
swelling the coal matrix. Based on the relative adsorption strength
in Table 1, the inventors expect that other SAGs, for example
H.sub.2S, having a higher atmospheric pressure boiling point and,
therefore, a stronger adsorption strength, will swell the coal
matrix to a greater degree than is caused by adsorption of an equal
volume of CO.sub.2. Therefore, the absolute permeability reduction
caused by injecting H.sub.2S is expected to be greater than that
caused by injecting an equal volume of CO.sub.2.
[0231] It will be understood however, that the relative sorption
capacity of compounds listed in Table 1 is provided for qualitative
purposes only. For example, some compounds, such as O.sub.2, may
chemically react with coal so that adsorption and/or desorption can
be affected by hysteresis effects.
[0232] Also, it will be understood that some fluids can be injected
as liquids, for example liquid CO.sub.2 and H.sub.2S, but may
vaporize under wellbore and/or formation conditions. Other fluids
will stay in the same phase after injection. For example, H.sub.2S
injected in a liquid state does not necessarily vaporize in the
coal bed.
[0233] During injection for ECBM or sequestration projects,
injected gases may be mixtures of SAGs and may include one or more
WAGs. Also, injected gas compositions may change over time. For
instance, for ECBM, since WAGs are known to increase produced
CH.sub.4 volumes more rapidly than SAGs, a greater WAG
concentration may be used early in the life of an ECBM project.
Later, WAGs breakthrough to production wells and the injected WAG
concentration may be reduced to reduce WAG concentration in the
produced gas. For both sequestration and ECBM, WAG injection
pressure is greater than for SAG, thereby increasing compression
requirements and cost. As a result, the WAG content in the injected
fluid may have to be adjusted to an economically acceptable level
at an appropriate time, to balance treatment and compression
costs.
[0234] Sources of CO.sub.2 include flue gas effluent from, for
example, without limitation, power plants or internal combustion
engines. Flue gases typically contain from about 13 to about 20%
CO.sub.2 and may require treatment to increase the CO.sub.2
concentration to optimum levels as discussed above.
[0235] An example of a H.sub.2S source is a gas-treating plant that
removes H.sub.2S from natural gas prior to sale. Such an effluent
is often a mixture of H.sub.2S and CO.sub.2 containing from about
5% to about 95% H.sub.2S.
[0236] Assumptions
[0237] Equation (1) makes the following assumptions:
[0238] 1. The theory of linear elasticity for strain changes is
applicable to coal. Specifically, the inventors' model assumes that
deformations in coal are proportional to stress and are not
permanent. This is a very common assumption for developing rock
mechanics models for many rock types.
[0239] 2. Reservoir strain is uniaxial. A uniaxial strain condition
is a condition where one principal stress dominates. In the case of
coal beds, the principal stress is normally in the vertical
direction due to overburden weight.
[0240] 3. The overburden weight and resulting overburden stress is
constant.
[0241] 4. The total bulk volume of the reservoir (including primary
and secondary porosity systems) is constant.
[0242] 5. Fluid compressibility in the SPS is high, which is a
reasonable assumption during gas injection and production since gas
compressibility is high relative to that of water and rock.
[0243] 6. Reservoir temperature remains constant. This is generally
the case, although there may be some relatively small temperature
changes near the wellbore if injected fluid temperatures are
dramatically different than the surrounding rock temperature.
[0244] 7. Coal bed SPS porosity is less than about 0.05.
[0245] 8. Rock mechanical properties, such as Poisson's ratio and
Young's modulus, are constant with changing pressure in accordance
with the analysis done by Zheng et al. ("Static and Dynamic Testing
of Coal Specimens" Paper 9120, 1991 Society of Core Analysts,
5.sup.th Annual Technical Conference, August 1991).
[0246] However, the inventors' model may be adjusted if it is
desirable to account for effects of changing one or more
properties, rather than assuming the property remains constant. For
example, it may be desirable to account for changes in overburden
stress due to, for example, differences in stress conditions in
coal seams at different depths. Also, it may be desirable to add a
temperature strain component to the inventors' model if the
reservoir temperature changes significantly. In addition, a coal at
significantly different overburden stress and/or temperature
conditions may have different coal rank and/or rock mechanical
properties that would cause differences in the pressure strain
component.
[0247] As indicated above, the inventors' model assumes a
substantially constant overburden stress. If desired, the
inventors' model may also be adjusted to account for the influence
of "effective" stress on rock mechanical properties caused by
changes in overburden stress. Effective stress is the difference
between the total stress (vertical and horizontal) and the SPS
pressure as shown by Equation (6) (Gidley, et al. Recent Advances
in Hydraulic Fracturing, SPE Monograph 12 (1989) p. 58).
.sigma..sub.e=.sigma.-bp (6)
[0248] where
[0249] .sigma..sub.e effective stress, psia
[0250] .sigma. total stress, psia
[0251] b poroelastic constant, dimensionless
[0252] p SPS pressure, psia
[0253] For many coal seams, the total stress in Equation (6) is
primarily due to the vertical stress caused by the overburden
weight. Accordingly, the vertical stress is dependent on the
vertical stress gradient, which is typically in the range from
about 1 to about 1.1 psi/ft. The vertical stress gradient can be
calculated, for example, by integrating density log data from the
surface to the depth of interest with Equation (7) as shown by
Gidley, et al. (ibid) 12 v ' = 0 z r 144 z ( 7 )
[0254] where
[0255] .sigma.'.sub..nu. vertical stress gradient, psi/ft
[0256] .rho..sub.r overburden rock density as a function of depth,
Ibm/ft.sup.3
[0257] dz infinitesimal change in depth, feet
[0258] z depth of interest, feet
[0259] When considering coal seams at different depths, the
differences in effective stress between seams caused by differences
in overburden weight or reservoir pressure may not be negligible.
For example, a deeper coal seam or deeper parts of the same coal
seam may be at a greater effective stress than the coal located at
shallower depths and .phi. and k.sub.a could be lower in the deeper
coals. As a result, .phi..sub.atm and k.sub.a-atm values for coals
located at different depths could be different. It is also possible
that coal seams at different depths could have different reservoir
pressures that may cause the initial effective stress condition to
be different.
[0260] For brevity, the model calibration method discussed more
fully below assumes that the overburden stress is constant for the
coal seam from which the calibration data were obtained. However,
as discussed above, in some cases, it may be desirable to relate
the calibrated model to effective stress so that the model can be
used at other effective stress conditions caused by differences in
depth that cause changes in overburden stress. Equation (8) can be
used to convert the calibrated model to be dependent on effective
stress. The value for the poroelastic constant, b, is normally
assumed to be one unless available data suggest otherwise.
.sigma..sub.e=.sigma.'.sub..nu.z-bp (8)
[0261] Because Equation (8) correlates SPS pressure and effective
stress, the calibrated model and porosity/permeability relationship
can be used for other effective stress conditions and other
.phi..sub.atm and k.sub.a-atm values.
[0262] Coal seams at different depths may require separate testing
to calibrate the inventors' model for each depth range. It would
also be more accurate to measure rock properties and gas storage
capacity parameters for each seam in this situation. The need to
measure reservoir data for coal seams at different depths is common
in the CBM production industry and is not unique to the inventors'
model.
[0263] It is also possible that the sorption strain component may
be affected by differences in temperature between seams, resulting
in different relationships between sorption strain and SPS
pressure. For example, increased temperature would cause the
primary porosity system to expand causing a contraction of the SPS
and a reduction in permeability. Conversely, decreased temperature
would cause the primary porosity system to contract allowing
expansion of the SPS and increased permeability.
[0264] Differences in temperature may also affect the relationship
between gas storage capacity and pressure as greater temperature
generally results in lower storage capacity, all other factors
being equal. Accordingly, at higher temperatures, storage capacity
is reduced and gas is released thereby reducing sorption strain. In
contrast, reduced temperatures could increase storage capacity
causing gas to be sorbed thereby increasing sorption strain.
[0265] Generally, the constant reservoir temperature assumption is
appropriate since (1) conductive and convective heat transfer while
gas is traveling down the well will either cool off hot gases or
warm up cold gases resulting in gas temperature similar to
reservoir temperature upon reaching the reservoir, and (2) even if
the injected gas does not reach reservoir temperature in the
wellbore, it will do so within several feet of the wellbore upon
entering the reservoir and should not affect the accuracy of the
inventors' model. However, in cases where reservoir temperature is
affected more significantly, it may be desirable to account for the
effects by adding a temperature strain component to Equation
(1).
[0266] One example of a temperature strain component, described in
Palmer & Mansoori (ibid), is presented below in Equation (9):
13 - d = - 1 M dP + [ K M + f - 1 ] dP - [ K M - 1 ] dT R ( 9 )
[0267] where
[0268] d.phi. infinitesimal change in SPS porosity,
dimensionless
[0269] M constrained axial modulus, psi
[0270] dP infinitesimal change in SPS pressure, psia
[0271] K bulk modulus, psi
[0272] f undefined fraction in Palmer & Mansoori between 0 and
1, ibid
[0273] .gamma. grain compressibility, psi.sup.-1
[0274] .alpha. grain thermal expansivity, .degree. F..sup.-1
[0275] dT.sub.R infinitesimal change in reservoir temperature,
.degree. F.
[0276] However, it should be noted that the Palmer and Mansoori
equation does not account for effects of temperature on sorption
strain. Specifically, as discussed above, gas storage capacity and
the amount of gas sorbed into coal is a function of temperature.
Accordingly, for improved accuracy, it is preferable to account for
changes in gas storage capacity as a function of temperature for
each gas of interest, for example, using test procedures known to
those skilled in the art.
[0277] There are few measured data relating coal bulk volume to
temperature changes. Accordingly, coal bulk volume data are
preferably measured in a laboratory for more accurate
representation of the thermal strain component.
[0278] If added to the inventors' model, the thermal strain
component is preferably calibrated with field test data. For
example, an injection test that purposely alters the reservoir
temperature sufficiently could provide k.sub.a estimates for
another temperature condition. In this case, either a very hot
fluid, such as steam, or a very cold fluid, such as liquid N.sub.2,
is injected, possibly at high injection rates, so that wellbore
heat transfer effects are reduced to allow the different
temperature fluid to enter the coal seam and penetrate the coal
seam a sufficient distance from the injection well.
[0279] Calibrating the Model
[0280] The claimed process has three principal components,
including:
2 Component 1 determining an initial condition in the coal bed,
including an initial SPS pressure and an initial sorbed gas
composition having an initial CH.sub.4 content Component 2
calibrating a pressure strain effect on the coal bed due to
increasing the SPS pressure to a value greater than the initial SPS
pressure Component 3 calibrating a sorption strain effect on the
coal bed due to changes in the sorbed gas composition resulting
from decreasing the CH.sub.4 content and increasing the content of
a SAG relative to the initial sorbed gas composition
[0281] As discussed above, one quantitative model for correlating
each of the three principal components is presented in Equation
(1). In that model, the dynamic pressure strain component is a
function of rock mechanical properties, specifically the
constrained axial modulus, M, which is a function of Young's
modulus, E, and Poisson's ratio, .nu., (see Equation (12) below).
Accordingly, as demonstrated by Equation (1) as one example of a
suitable model, it is possible that rock mechanical properties may
be estimated from laboratory tests on coal samples or from
literature data. In that case, two field tests for
initial-condition data and SAG production data can be used for the
claimed method. However, the accuracy of the method and the model
is improved by conducting an injection test. Accordingly,
preferably, data for each of the three principal components is
determined from at least three field tests.
[0282] In a more preferred embodiment, the pressure strain
component is calibrated from a water injection test and the
characteristic sorption strain parameters for CH.sub.4 and SAG are
calibrated from an initial condition test and a SAG production
test. In this preferred embodiment there are 3 tests, including 2
tests for calibrating characteristic sorption strain parameters for
two components, n, of a fluid composition, specifically, CH.sub.4
and a SAG. Most preferably, (n+1) test conditions are used for
calibrating the model, where n is the number of major components of
a pre-selected fluid composition. Each test condition may not
require injection. For example, if a WAG injection test is used for
calibrating the pressure strain component, a WAG production test
can be used for calibrating sorption strain parameters for WAG by
providing additional sorbed gas composition data.
[0283] As discussed more fully below, each principal component test
produces, among other parameters, an k.sub.a value for a SPS
pressure and a specified fluid composition (hereinafter, "test
condition"). Accordingly, preferably, at least three k.sub.a values
are determined for three different test conditions, differing in
fluid composition and/or SPS pressure. Also, accuracy of the model
can be even further enhanced by adding other test conditions, as
discussed more fully below.
[0284] The SPS pressure values used in Equation (1) for principal
components 1 and 3 are substantially equal to the initial SPS
pressure. However, as discussed more fully below, principal
component 2 preferably involves an injection test using either
water or WAG. In this case, the SPS pressure for the injection test
is the average pressure within the SPS in the region of the
reservoir that has been affected by the injected fluid.
Accordingly, the SPS pressure for principal component 2 may be
lower than the bottom-hole pressure. While it is possible to
calculate the average pressure within the affected region, as well
as the extent of the affected region, for simplicity, the
bottom-hole pressure at the end of the injection period may be used
as a first order approximation of the SPS pressure in the affected
region. This approximation can be refined later with more accurate
methods, for example by reservoir simulation, if desired.
[0285] Initial estimated values for .phi. and .epsilon., are
selected for each of the at least three test conditions in a manner
discussed more fully below. Then for each of the at least three
test conditions, Equations (1) and (2) are solved for .phi..sub.atm
and k.sub.a-atm. If the .phi..sub.atm and k.sub.a-atm values for
each test condition are not independently substantially equal, the
initial estimated .phi. and .epsilon. values are adjusted, as
discussed more fully below. Revised values for .phi..sub.atm and
k.sub.a-atm are then calculated according to Equations (1) and (2).
Again, the .phi..sub.atm and k.sub.a-atm values for each test
condition are independently compared. The computation continues
until the .phi..sub.atm and k.sub.a-atm values for each test
condition are independently substantially equal. The calibrated
model can then be used for predicting .phi. and permeability for a
pre-selected injection and/or production pressure and fluid
composition.
[0286] Determining Initial Absolute Permeability
[0287] As stated above, one principal component of the claimed
method is determining k.sub.a-i. A method for determining k.sub.a-i
from production data is described below under "Determining
Permeability Values from Production Data." Alternatively, k.sub.a-i
may be determined from a gas or water injection test, discussed
more fully below under "Calibrating Dynamic Pressure Strain
Component." A gas or water injection test is particularly useful
when primary production is too low to accurately determine the
initial effective conductivities to gas and water. However, the gas
or water injection test does not yield produced fluid composition
data. Accordingly, unless produced fluid composition data are
available from a prior production process, produced fluid
composition data will not be available for assisting in calibrating
the sorption strain component. In this situation, gas composition
estimates can be obtained by desorption of coal samples.
Preferably, k.sub.a-i is determined with primary production data
by:
[0288] (1) determining the initial effective conductivity to gas
and the initial effective conductivity to water;
[0289] (2) determining the coal thickness;
[0290] (3) calculating the initial effective permeability to gas,
k.sub.eg-i, and the initial effective permeability to water,
k.sub.ew-i, by dividing the respective initial effective
conductivity from step (1) by the coal thickness from step (2);
[0291] (4) calculating the initial effective gas-water permeability
ratio, k.sub.e-i ratio=k.sub.eg-i/k.sub.ew-i using the values
calculated in step (3);
[0292] (5) calculating the initial relative gas-water permeability
ratio, k.sub.r-i ratio (=k.sub.rg-ik.sub.rw-i), which is equal to
the k.sub.e-i ratio calculated in step (4) because k.sub.a-i is the
same for both gas and water at a specific test condition;
[0293] (6) determining the corresponding initial water saturation,
S.sub.w-i, initial relative permeability to gas, k.sub.rg-i, and
the initial relative permeability to water, k.sub.rw-i, for the
k.sub.r-i ratio calculated in step (5); and
[0294] (7) calculating k.sub.a-i=k.sub.eg-i/k.sub.rg-i
[0295] The effective conductivity to gas and the effective
conductivity to water in step (1) may be determined from, for
example, without limitation, a pressure build-up test, an
interference test, a production test, a production test combined
with a water injection-falloff test, or a production test combined
with a water slug test. These tests are generally known to those
skilled in that art. But, for convenience, each test is briefly
described under the heading "Effective Conductivity Tests."
Preferably, the effective conductivities are determined from a
production test followed by a pressure build-up test or an
interference test. Most preferably, the effective conductivities
are determined from a production test followed by a pressure
build-up test.
[0296] A production test preferably provides data including,
without limitation, surface pressure, surface temperature,
bottom-hole pressure, bottom-hole temperature, gas and water
production rates and produced fluid composition. The produced fluid
composition is used as the initial in-situ free gas composition for
determining the initial sorbed gas composition used in calibrating
the sorption strain component, as discussed more fully below.
During a production test, the bottom-hole pressure and temperature
are monitored directly in a manner known to those skilled in the
art or estimated from surface temperature and pressure in a manner
known to those skilled in the art. Preferably, bottom-hole pressure
and temperature are monitored directly.
[0297] Effective conductivity testing and analysis procedures are
known to those skilled in the art of well testing. See for example
GRI-94/0397 (Mavor, M. and Saulsberry, J., ibid).
[0298] The coal thickness in step (2) is generally determined by
methods known to those skilled in the art, for example, from log
data., Log data types include, for example, without limitation,
static measurements performed without producing the well and
dynamic measurements performed during production.
[0299] The most common log used to estimate coal thickness is a
density log that presents density as a function of depth. Coal
density is significantly less than surrounding inorganic rock
density. Accordingly, by analyzing the density data, the coal
thickness can be determined by setting a maximum density limit of
about 1.75 g/cm.sup.3, for example.
[0300] Other logs that can be used to estimate coal thickness
include, without limitation, gamma ray, neutron porosity, and
resistivity logs. In some cases, coal thickness is estimated from
the penetration rate while drilling, since coal is drilled more
rapidly than inorganic rocks. However, thickness estimates from
gamma ray, neutron porosity, resistivity logs and penetration data
are less accurate than from density log data because the vertical
resolution of these data is less than that for a density log.
[0301] Production logs measure the relative flow rate of gas and
water as a function of depth. Production logs are more direct
indicators of the thickness of the coal seams through which gas and
water is entering the well. However, because of cost and the risk
of losing production logging tools in the well, operators rarely
measure these data.
[0302] With respect to step (6), the k.sub.r-i ratio calculated in
step (5) is used to determine the corresponding S.sub.w-i,
k.sub.rg-i and k.sub.rw-i. The correlation with the k.sub.r-i ratio
can be determined with relative permeability tables based on, for
example, without limitation, laboratory measurements performed on
samples from the coal bed of interest, analysis of production
behavior during the life of the reservoir, or literature data.
[0303] Preferably, relative permeability data are measured on
representative samples from the coal bed of interest. An advantage
of using laboratory measurements is that the data are from the
specific reservoir of interest and should be more accurate than
estimates from other sources. Even when measured, however, the data
may differ from the actual in-situ relative permeability since (a)
the samples may not be representative of the average in-situ
conditions due to reservoir heterogeneity and (b) intact samples
are generally from lower permeability portions of the reservoir.
Therefore, operators usually do not measure these data because,
even if they do so, the data may not be representative, the
measurements are expensive and time consuming and few commercial
laboratories can measure these data accurately.
[0304] Accordingly, reliable published data are often more cost
effective. However, because the coal samples used to produce the
published data are not likely representative of the coal bed of
interest, there will be some error introduced into the calibration.
But this error can be minimized if the same set of relative
permeability relationships is used consistently in all engineering
analyses including, without limitation, well test analysis and
reservoir simulation forecasts of production and pressure
behavior.
[0305] An example of suitable published data is found in Gash et
al. (ibid). Gash et al. produced gas-water relative permeability
curves as a function of gas saturation for a number of core
samples. Gash et al.'s graph was redrawn by the inventors in FIG. 4
to show the Gash et al. relationship in terms of relative
permeability as a function of water saturation. The curves were
then digitized by the present inventors and the results are
presented in Table 2 below.
3 TABLE 2 S.sub.w K.sub.rw K.sub.rg K.sub.rg/K.sub.rw 0.000 0.000
1.000 .infin. 0.050 0.000 0.835 .infin. 0.100 0.000 0.720 .infin.
0.150 0.002 0.627 313.5 0.200 0.007 0.537 76.71 0.250 0.015 0.465
31.00 0.300 0.024 0.401 16.71 0.350 0.035 0.342 9.771 0.400 0.049
0.295 6.020 0.450 0.067 0.253 3.776 0.500 0.088 0.216 2.455 0.550
0.116 0.180 1.552 0.600 0.154 0.147 0.955 0.650 0.200 0.118 0.590
0.700 0.251 0.090 0.359 0.750 0.312 0.070 0.224 0.800 0.392 0.051
0.130 0.850 0.490 0.033 0.067 0.900 0.601 0.018 0.030 0.950 0.731
0.007 0.010 0.975 0.814 0.000 0.000 1.000 1.000 0.000 0.000
[0306] Table 2 can therefore be used to obtain S.sub.w-i,
k.sub.rw-i and k.sub.rg-i estimates for the k.sub.r-i ratio
calculated in step (5). Thereafter, k.sub.a-i can be calculated by
dividing k.sub.eg-i calculated in step (3) by k.sub.rg-i estimated
using the data in Table 2.
[0307] Alternatively, k.sub.rg-i may be determined from production
data, as discussed below under "Determining Permeability Values
from Production Data."
[0308] Parameters determined from the data gathered during the test
for the first principal component may include, without
limitation:
4 Parameter Symbol Effective permeability to gas at initial
reservoir pressure and k.sub.eg-i composition Effective
permeability to water at initial reservoir pressure and k.sub.ew-i
composition Absolute permeability at initial reservoir pressure and
k.sub.a-i composition Porosity at initial reservoir pressure and
composition .phi..sub.i Water saturation at initial reservoir
pressure S.sub.w-i Initial reservoir pressure p.sub.i Initial free
and sorbed gas composition
[0309] As discussed above, an estimate for .phi..sub.i may be used
for calibrating the inventors' model. And, as discussed more fully
below, .phi..sub.i may be determined from water production rates
using, reservoir simulation or water material balance techniques.
However, there are some situations (e.g., when water production is
low), when accurate porosity estimates cannot be obtained from the
first principal component. In these situations, as discussed more
fully below, a "best-guess" estimate for .phi. for at least one
test condition may be used as an initial estimate and thereafter
adjusted during the calibration process.
[0310] The value for k.sub.a-i is subsequently used for calibrating
the model in the claimed process. Specifically, k.sub.a-i is used
in Equation (2) to determine k.sub.a-atm. Also, as discussed more
fully below, k.sub.a-i may be used to correlate one .phi. estimate
for estimating initial .phi. values for other test conditions.
Then, the values for .phi..sub.atm and k.sub.a-atm calculated for
the initial test condition are independently compared to
.phi..sub.atm and k.sub.a-atm values calculated for other test
conditions. Also, the initial free and sorbed gas composition data
are used for calibrating the sorption strain component of the
model, as discussed more fully below.
[0311] Also, as discussed more fully below, if the .phi..sub.atm
and k.sub.a-atm values for each test condition are not
independently equal, the initial estimates for .phi., and/or the
characteristic sorption strain parameters for each fluid component
are adjusted and .phi..sub.atm and k.sub.a-atm values are
re-calculated for each test condition. The value for k.sub.a-i
calculated above, however, remains fixed for the iterative
computation, which continues until the .phi..sub.atm and
k.sub.a-atm values for each test condition are independently
substantially equal.
[0312] Once the .phi..sub.atm and k.sub.a-atm values are
determined, S.sub.w-atm can be computed by multiplying S.sub.w-i by
the normalized porosity .phi./.phi..sub.atm, in Equation (31),
presented and discussed more fully below under "Using the
Calibrated Model." Then .phi..sub.atm, k.sub.a-atm, and S.sub.w-atm
can be used in Equations (1), (2) and (30) to predict porosity and
permeability for a pre-selected injection and/or production
pressure and fluid composition.
[0313] Calibrating Dynamic Pressure Strain Component
[0314] A second principal component of the process claimed herein
is calibrating the dynamic pressure strain component,
[(p-p.sub.atm)/.phi..sub.atmM], of Equation (1) at a SPS pressure
greater than the initial SPS pressure. As discussed above, the
dynamic pressure strain component is a function of rock mechanical
properties, specifically M, which is a function of E and .nu., as
illustrated in Equation (12). It is possible that an estimated
value for M may be estimated from laboratory tests on coal samples
or from literature data. However, M is preferably determined from a
field injection test, as discussed more fully below. Although
discussed independently, it will be appreciated that the pressure
strain and sorption strain components of Equation (1) are not
solved independently. The process claimed herein results in values
for .phi..sub.atm and k.sub.a-atm by solving Equations (1) and (2)
as a whole.
[0315] Nonetheless, as discussed above, the dynamic pressure strain
component is a measure of the effect of changes in pressure inside
the SPS. Accordingly, in order to isolate the effect of pressure
strain from the effect of sorption strain on porosity and
permeability, an injection fluid is preferably injected into the
coal bed at a pressure greater than the initial SPS pressure.
Preferably, the injection fluid is water or a WAG. More preferably,
the injection fluid is water. Most preferably, the dynamic pressure
strain component is calibrated in two steps by first injecting
water, then by injecting a WAG.
[0316] As stated earlier, when water is injected into a coal bed,
the SPS balloons with increased pressure. However, water has
substantially no effect on sorption strain. Accordingly, the effect
on the dynamic pressure strain component can be substantially
isolated from sorption strain effects. Therefore, the dynamic
pressure strain component is more preferably calibrated by
injecting water.
[0317] The SPS also balloons with increased pressure when a WAG is
injected. However, there may be some sorption strain effect caused
by stripping CH.sub.4 with a WAG, resulting in a change in sorbed
gas composition. Nonetheless, although coal may have a higher
sorption capacity for some WAGs, for example N.sub.2, than it does
for water or helium, the pressure strain component will still be
more dominant than the sorption strain component for N.sub.2.
However, an advantage of using a WAG is that WAG
injection/production data also provide additional information, for
example, WAG sweep efficiency, which may be useful for other
aspects of an operation. Also, fluid composition data collected
from a WAG injection test provide additional calibration data for
predicting .phi. and permeability for a wider range of fluid
compositions. So, although WAG may be used for calibrating the
dynamic pressure strain component alone, in a most preferred
embodiment WAG injection is conducted after a first injection test
with water.
[0318] Injection data include, without limitation, injection rates,
surface pressure, surface temperature, bottom-hole pressure and
bottom-hole temperature. Bottom-hole pressure and temperature may
be determined by monitoring directly in a manner known to those
skilled in the art or by estimating from surface temperature and
pressure in a manner known to those skilled in the art. Preferably,
bottom-hole pressure and temperature are monitored directly.
Injection fluid composition data may also be collected during the
injection test, particularly in the case of WAG injection.
[0319] Calibrating the dynamic pressure strain component preferably
includes determining an absolute permeability from the data
collected. If water is injected, the absolute permeability is
approximated by k.sub.ew-H20-inj from the injection portion of the
test and k.sub.ew-i, from the falloff (shut-in) portion of the
test. If WAG is injected for calibrating the pressure strain
component, a WAG injection absolute permeability, k.sub.a-WAG-inj
is determined from effective conductivity data in a manner
discussed more fully below.
[0320] If water injection is used, alone or in combination with WAG
injection, water is injected at a pressure greater than P.sub.R. A
water injection test is preferably conducted for a period in a
range from about 2 hours to about 24 hours. More preferably, the
water injection test period is in a range from about 4 hours to
about 8 hours. Although water may be injected in a liquid and/or
vapor phase, water is preferably injected in a liquid phase.
Preferably, any change in the reservoir temperature caused by the
injected fluid is less than about 10.degree. C. so that temperature
effects upon strain parameters can be assumed negligible. More
preferably, any change in the reservoir temperature caused by
injecting fluid is less than about 5.degree. C.
[0321] The effective conductivity to water is determined in a
manner discussed below under "Effective Conductivity Tests." The
resulting effective conductivity to water obtained from a water
injection test approximates the absolute conductivity since gas can
be effectively displaced by water during injection. Accordingly,
there is a lesser requirement for determining relative permeability
to water when a water injection test has been used. Based upon the
inventors' experience, water injection can reduce the near-well gas
saturation to residual levels between 0 and 10%. When possible, the
residual gas saturation is selected to obtain absolute permeability
estimates that are consistent with those obtained from production
tests before and/or after injection.
[0322] If determined from a water injection test, the effective
conductivity and effective permeability to water, k.sub.ew-H20-inj,
are determined at the elevated water injection pressure. And
because gas is displaced by water, k.sub.ew-H2O-inj is either equal
to or less than the absolute permeability at water injection
pressure, k.sub.a-H20-inj depending upon the magnitude of the
residual gas saturation. Water injection pressures depend upon the
absolute permeability of a coal seam and can range from tens of psi
above P.sub.R to thousands of psi above P.sub.R.
[0323] If a fall-off test is performed after water injection, the
effective permeability to water approximates k.sub.a-i, since the
pressure rapidly approaches the original reservoir pressure. As
discussed above, k.sub.a-i is also determined in the first
principal component, albeit in a different manner. The k.sub.a-i
estimates obtained from these different tests should be
substantially equal. k.sub.a-i estimates that are not substantially
equal signal that the residual gas saturation should be adjusted or
the relative permeability relationships used in determining the
first principal component should be adjusted. As discussed more
fully above, relative permeability data are normally obtained from
published data. Accordingly, an advantage of using two methods for
determining k.sub.a-i is that the relative permeability data can be
substantiated or adjusted for other absolute permeability
determinations discussed below.
[0324] If a WAG is injected, alone or in combination with water
injection, the WAG is injected at a pressure greater than P.sub.R.
The WAG can be injected in a single injection period, a longer
continuous injection period, or multiple injection periods.
Preferably, the WAG is injected for a time in a range from about 6
hours to about 30 days. For example, a single truckload of N.sub.2
typically contains about 7,200 gallons (27 m.sup.3) N.sub.2, which
when vaporized is 670,000 scf. This volume can be injected into a
well for a period ranging from about 1 hour to about 8 hours.
Preferably, any change in the reservoir temperature caused by the
injected fluid is less than about 10.degree. C. so that temperature
effects upon strain parameters can be assumed negligible. More
preferably, any change in the reservoir temperature caused by
injecting fluid is less than about 5.degree. C. At greater
temperature changes, any reduction in storage capacity and any
thermal stress effects, as discussed above in the section entitled
"Assumptions," should preferably be taken into account.
[0325] The overall WAG injection duration depends upon the volume
of WAG that must be injected into the well. The injection duration
can be determined by techniques known to those skilled in the
art.
[0326] The preferred injection time and volume is selected so that
the WAG is sorbed into a region extending at least about 30 feet
from the well to the average edge of the injection front. More
preferably, the WAG-sorbed region is from about 50 feet to about
150 feet from the well. The volume of WAG required to produce the
desired WAG-sorbed region is preferably estimated from the WAG
storage capacity of the coal seam of interest. The area of the
WAG-sorbed region can be estimated with Equation (10). Meanwhile,
the distance into the reservoir that the WAG penetrates can be
estimated by assuming a shape for the WAG-sorbed region. For
example, if the WAG-sorbed region is distributed in a generally
circular pattern centered around the well, the distance to the
outer edge of the sorbed region can be calculated with Equation
(11). The WAG storage capacity in Equation (10) is, in turn,
determined by sorption isotherm measurements and extended Langmuir
isotherm calculations for estimated in-situ fluid compositions, for
example, in the manner discussed more fully below under
"Determining Free & Sorbed Gas Composition." In the design
stage, the in-situ gas composition can be assumed based upon
experience. Fluid composition data measured later will be used for
the calibration process. 14 A inj = 32.0368 V inj h _ c G s ( 10 )
r inj = A inj ( 11 )
[0327] where
[0328] A.sub.inj area of gas sorbed region, ft.sup.2
[0329] V.sub.inj volume of injected gas, scf
[0330] h coal thickness, feet
[0331] {overscore (P)}.sub.c average coal seam density,
g/cm.sup.3
[0332] G.sub.s total gas storage capacity, scf/ton
[0333] r.sub.inj gas penetration distance from the wellbore for
circular injection area, feet
[0334] The WAG injection volume in Equation (10) excludes the
volume of WAG required to fill up the wellbore. The total injection
volume, which includes the wellbore volume and the volume that
enters the coal seam, is preferably significantly greater than the
volume of the wellbore and meets or exceeds the required
penetration distance. Preferably, the total WAG injection volume is
at least twice the volume of the wellbore. More preferably, the
total WAG injection volume is from about 5 times to 20 times the
wellbore volume. Generally, the wellbore volume criterion is not an
operational constraint since a single truck load of N.sub.2 often
contains 10 or more times the wellbore volume depending upon the
diameter and depth of the well.
[0335] The fluid used for WAG injection preferably contains at
least about 70% (vol.) WAG. More preferably, the injected WAG
contains at least about 85% (vol.) WAG. Most preferably, the
injected WAG contains substantially no SAG. Suitable WAGs are
listed in Table 1. The injected WAG may contain one or more WAGs.
Preferably, however, only one type of WAG is used in the test
procedure.
[0336] During the WAG injection period, the gas injection rates and
composition, surface and bottom-hole pressures and temperatures,
are measured. Bottom-hole pressure and temperature may be monitored
directly in a manner known to those skilled in the art or estimated
from surface temperature and pressure in a manner known to those
skilled in the art. Preferably, bottom-hole pressure and
temperature are monitored directly.
[0337] Following WAG injection, the well is then shut-in for a soak
period sufficient to equilibrate the in-situ fluid composition.
During the soak period, surface and bottom-hole pressures and
temperatures are determined. Bottom-hole pressure and temperature
may be monitored directly in a manner known to those skilled in the
art or estimated from surface temperature and pressure in a manner
known to those skilled in the art. Preferably, bottom-hole pressure
and temperature are monitored directly.
[0338] The length of the shut-in period depends upon coal
diffusivity, which is typically determined by measurement of the
gas volume released from freshly cut coal samples as a function of
time. Diffusivity is inversely proportional to sorption time,
t.sub.s, which is defined as the time required to release 63% of
the gas from a coal sample maintained at constant temperature.
Accordingly, the higher the diffusivity, the shorter the sorption
time. Gas Institute Report GRI-97/0263 (Mavor et al. "Coalbed
Reservoir Gas-In-Place Analysis" pg. 3.1-3.20; 1997) describes
diffusivity estimate techniques. Factors affecting diffusivity
include coal composition, temperature, and water content. As an
alternative, the method described in Mavor, M. J. et al.
"Measurement and Evaluation of Coal Sorption Isotherm Data," (SPE
20728, 65th Annual Technical Conference of the Society of Petroleum
Engineers, New Orleans, La, Sep. 23-26, 1990) can be used to
determine the sorption time for WAG at reservoir temperature.
[0339] Diffusivity tests do not distinguish between gases but the
inventors believe that different gases would provide different
diffusivity values. Accordingly, as used herein, t.sub.s-CBM is the
sorption time determined from original in-situ CBM at reservoir
temperature. Typically t.sub.s-CBM is in a range from about 3 to
about 500 hours, more typically in a range from about 5 hours to
about 48 hours, when measured at reservoir temperature.
[0340] Preferably, the WAG shut-in period is conducted for at least
about 0.5 t.sub.s-CBM. More preferably, the shut-in period is in a
range from about 0.5 t.sub.s-CBM to about 4 t.sub.s-CBM. Most
preferably, the shut-in period is in a range from about t.sub.s-CBM
to about 2 t.sub.s-CBM. Although some sorption times might suggest
a shut-in period of about 1.5 hours, practically, the shortest time
for a WAG shut-in is about 24 hours. Expressed in units of time,
preferably the WAG shut-in period is at least about 24 hours. More
preferably, the shut-in period is in a range from about 24 hours to
about 80 days. Most preferably, the shut-in period is in a range
from about 24 hours to about 40 days. As another general guide, the
WAG shut-in time is greater than about 1.5 times the WAG injection
time to have sufficient falloff data for estimating
permeability.
[0341] A production period following WAG shut-in is used to
determine produced fluid composition and in-situ S.sub.w. The
length of the production period is preferably in a range from about
2 days to about 7 days. More specific tests times for permeability
estimates based upon the radius of investigation of the test can be
determined in a manner known to those skilled in the art. Data
collected during the production period include, without limitation,
surface and bottom-hole pressures and temperatures, gas and water
production rates, and produced fluid composition. Again,
bottom-hole pressure and temperature may be determined by
monitoring directly in a manner known to those skilled in the art
or by estimating from surface temperature and pressure in a manner
known to those skilled in the art. Preferably, bottom-hole pressure
and temperature are monitored directly.
[0342] Optionally, a second shut-in period following production may
be conducted to determine any changes in k.sub.eg and k.sub.ew
caused by sorption strain effects due to changes in sorbed gas
composition following WAG injection. If a second shut-in period is
performed, data collected include, without limitation, surface and
bottom-hole pressures and temperatures. Again, bottom-hole pressure
and temperature may be determined by monitoring directly in a
manner known to those skilled in the art or by estimating from
surface temperature and pressure in a manner known to those skilled
in the art. Preferably, bottom-hole pressure and temperature are
monitored directly.
[0343] Preferably, k.sub.a-WAG-inj is determined by:
[0344] (1) determining the effective conductivity to gas during WAG
injection;
[0345] (2) determining the coal thickness (previously determined
for calculating k.sub.a-i);
[0346] (3) calculating the WAG injection effective permeability to
gas, k.sub.eg-WAG-inj, by dividing the WAG injection effective
conductivity to gas from step (1) by the coal thickness from step
(2). As discussed below under "Effects of Relative Permeability,"
the effective permeability to water does not change significantly
with pressure. Accordingly, the effective permeability to water
during WAG injection can be assumed to be the same as the effective
permeability to water determined from the first principal
component, i.e., when calculating k.sub.a-i;
[0347] (4) calculating the WAG injection effective gas-water
permeability ratio, k.sub.e-WAG-inj
ratio=k.sub.eg-WAG-inj/k.sub.ew-WAG-inj using the values calculated
in step (3);
[0348] (5) calculating the WAG injection relative gas-water
permeability ratio, k.sub.r-WAG-inj ratio
(=k.sub.rg-WAG-inj/k.sub.rw-WAG-inj), which is equal to the
k.sub.e-WAG-inj ratio calculated in step (4) because
k.sub.a-WAG-inj is the same for both gas and water at a specific
test condition;
[0349] (6) determining the corresponding WAG injection water
saturation, S.sub.w-WAG-inj, WAG injection relative permeability to
gas, k.sub.rg-WAG-inj, and the WAG injection relative permeability
to water, k.sub.rw-WAG-inj, for the k.sub.r-WAG-inj ratio
calculated in step (5); and
[0350] (7) calculating k.sub.a-WAG-inj32
k.sub.eg-WAG-inj/k.sub.rg-WAG-inj- .
[0351] The steps outlined above may be conducted in the same manner
as discussed above for determining k.sub.a-i.
[0352] The constrained axial modulus, M, used in the dynamic
pressure strain component of Equation (1) is a function of rock
mechanical properties E (Young's modulus) and v (Poisson's ratio)
as defined in Equation (12): 15 M = E 1 - v ( 1 + v ) ( 1 - 2 v ) (
12 )
[0353] where
[0354] M constrained axial modulus, psi
[0355] E Young's modulus, psi
[0356] .nu. Poisson's ratio, dimensionless
[0357] As illustrated in Example 3 below, the values for E and .nu.
have an effect on the accuracy of the calibration. Accordingly,
even though E and .nu. values can be found in literature data, E
and .nu. are preferably determined from test condition data or by
laboratory measurements on representative samples from the coal bed
of interest. Typically, coal is weaker than rocks such as sandstone
and has a smaller E and a larger .nu.. See, for example, Gidley et
al., p. 225 (ibid). Techniques for measuring E and v from coal
samples are described in, for example, Zheng et al. (ibid).
[0358] Alternatively, published data may be used for providing
initial estimates for E and .nu.. See, for example, Mavor et al.,
SPE 39105, (ibid). Preferably, the published data used for
estimating E and .nu. were determined for coal of a similar rank
and from the same basin. However, if used, the initial estimates
for E and .nu. should be revised during the calibration.
[0359] One method for determining M from test condition data is
based on using the relationship between porosity and permeability
in Equation (2). Specifically, M becomes a function of the
relationship between absolute permeability values between two test
conditions. Preferably, the two test conditions used for
determining M are water injection and production. Data from a WAG
injection test may be used. However, since there is some influence
on sorbed gas composition, and therefore sorption strain, the
pressure strain effect will not be isolated and the value for M may
not be accurate. In contrast, in a water injection test, there is
substantially no change in the sorption strain as water does not
change the sorbed gas content. Accordingly, the SPS porosity for
the water injection test can be related to the initial-condition
SPS porosity with Equation (13). 16 i - H2O - inj = p i - p H2O -
inj M ( 13 )
[0360] Since, the SPS porosity values are related to the absolute
permeability from each test in the manner of Equation (2), it is
possible to combine Equations (14) and (15) to solve for M. 17 H2O
- inj = i ( k a - H2O - inj k a - i ) 1 3 ( 14 ) M = p H2O - inj -
p i i [ ( k a - H2O - inj k a - i ) 1 3 - 1 ] ( 15 )
[0361] Once determined, the value of M estimated with Equation (15)
is the value used in the model for determining .phi..sub.atm and
k.sub.a-atm. As stated above under "Calibrating the Model", the
bottom-hole pressure after injection is higher than the SPS
pressure. Accordingly, the estimated value for M may be higher than
actual. Therefore, in order to improve the accuracy, the value for
P.sub.H2o-inj is preferably an average pressure within the region
affected by water injection, which typically occurs relatively
close to the wellbore, i.e., within 10 to 20 feet. As a first
approximation, this average pressure is similar to the average of
the bottom-hole pressure at the end of injection and the average
reservoir pressure. An even more accurate estimate for
P.sub.H2o-inj could be determined mathematically by integrating the
near-well pressure distribution. The near-well pressure
distribution can be computed, for example, with a reservoir
simulator.
[0362] Parameters determined by the second principal component, if
using water injection, include, without limitation:
5 Parameter Symbol Effective permeability to water at water
injection SPS pressure k.sub.ew-H2O-inj Effective permeability to
water at initial SPS pressure k.sub.ew-i Absolute permeability at
water injection SPS pressure k.sub.a-H2O-inj Absolute permeability
at initial SPS pressure k.sub.a-i Water injection SPS pressure
p.sub.H2O-inj Initial SPS pressure p.sub.i Constrained axial
modulus M
[0363] Parameters determined by the second principal component, if
using WAG injection, include, without limitation:
6 Parameter Symbol Effective permeability to gas at WAG injection
SPS pressure k.sub.eg-WAG-inj and composition Effective
permeability to water at WAG injection SPS k.sub.ew-WAG-inj
pressure and composition Absolute permeability at WAG injection SPS
pressure and k.sub.a-WAG-inj composition Water saturation at WAG
injection SPS pressure S.sub.w-WAG-inj Free and sorbed gas
composition during WAG injection WAG injection SPS pressure
p.sub.WAG-inj
[0364] As discussed above, an estimate for .phi..sub.H2O-inj or
.phi..sub.WAG-inj is used for calibrating the inventors' model.
Techniques for determining an initial estimate for
.phi..sub.H2O-inj or .phi..sub.WAG-inj are discussed more fully
below.
[0365] The values for k.sub.a-H2O-inj or k.sub.a-WAG-inj, k.sub.a-i
and M are subsequently used for calibrating the model in the
claimed process. Specifically, k.sub.a-H2O-inj or k.sub.a-WAG-inj,
and k.sub.a-i are used in Equation (2) to determine k.sub.a-atm
values for each test condition. Also, as discussed more fully
below, k.sub.a-H2O-inj or k.sub.a-WAG-inj, and k.sub.a-i may be
used to correlate one .phi. estimate for initial .phi. values for
other test conditions. Then the values for .phi..sub.atm and
k.sub.a-atm calculated for water and/or WAG test conditions are
independently compared to .phi..sub.atm and k.sub.a-atm values
calculated for other test conditions. Also, if WAG was injected,
the free and sorbed gas composition data are used for calibrating
the sorption strain component of the model, as discussed more fully
below. Reference to gas composition data during WAG injection will
be understood to mean the first produced gas composition during a
production period following WAG injection and a soak period. If
water injection is used for calibrating the second principal
component, the free and sorbed gas compositions are assumed to be
same as the initial free and sorbed gas compositions.
[0366] As discussed more fully below, if the .phi..sub.atm and
k.sub.a-atm values for each test condition are not independently
equal, the initial estimates for .epsilon. and .phi. values are
adjusted and .phi..sub.atm and k.sub.a-atm values are re-calculated
for each test condition. The values for k.sub.a-H2O-inj or
k.sub.a-WAG-inj and k.sub.a-i and M calculated above, however,
remain fixed for the iterative computation, which continues until
the .phi..sub.atm and k.sub.a-atm values for each test condition
are independently substantially equal.
[0367] Calibrating Dynamic Multicomponent Sorption Strain
Component
[0368] A third principal component of the process claimed herein is
calibrating the dynamic multicomponent sorption component, 18 [ 1 a
t m ( 1 - K M ) ( a t m - ) ] ,
[0369] of Equation (1) using a SAG. It will be appreciated that the
pressure strain and sorption strain components of Equation (1) are
not solved independently. The process claimed herein results in
values for .phi..sub.atm and k.sub.a-atm by solving Equations (1)
and (2) as a whole.
[0370] Nonetheless, as discussed above, the dynamic multicomponent
sorption strain component is a measure of the effect of coal matrix
shrinkage or swelling due to adsorption or desorption of fluids and
fluid composition. Although there is an interaction between
pressure strain effects versus sorption strain effects on porosity
and permeability, the sorption strain effect is more dominant when
a SAG is injected. Accordingly, in order to determine the effect of
sorption strain, a SAG is injected into the coal bed at a pressure
greater than P.sub.R.
[0371] SAG can be injected in a single injection period, a longer
continuous injection period, or multiple injection periods.
Preferably, SAG is injected for a time in a range from about 6
hours to about 30 days. For example, a single truckload of CO.sub.2
typically contains about 16.5 tons of CO.sub.2 (274 Mscf vapor
equivalent). This volume can be injected into a well for a period
ranging from about 1 hour to about 8 hours. Preferably, any change
in the reservoir temperature caused by the injected fluid is less
than about 10.degree. C. so that temperature effects upon strain
parameters can be assumed negligible. More preferably, any change
in the reservoir temperature caused by injecting fluid is less than
about 5.degree. C. At greater temperature changes, any reduction in
storage capacity and any thermal stress effects, as discussed above
in the section entitled "Assumptions," should preferably be taken
into account.
[0372] The overall SAG injection duration depends upon the volume
of SAG that must be injected into the well. The preferred injection
time and volume is selected so that the SAG is sorbed into a region
extending at least about 30 feet from the well to the average edge
of the injection front. More preferably, SAG-sorbed region is from
about 50 feet to about 150 feet from the well. The volume of SAG
required to produce the desired SAG-sorbed region is preferably
estimated from the SAG storage capacity of the coal seam of
interest. The area of the SAG-sorbed region can be estimated with
Equation (10) above. Again, the distance into the reservoir that
the SAG penetrates can be estimated by assuming a shape for the
SAG-sorbed region. For example, if the SAG-sorbed region is
distributed in a generally circular pattern centered around the
well, the distance to the outer edge of the sorbed region can be
calculated with Equation (11). The SAG storage capacity in Equation
(10) is, in turn, determined by sorption isotherm data and extended
Langmuir isotherm calculations for estimated in-situ fluid
compositions, for example, in the manner discussed more fully below
under "Determining Free & Sorbed Gas Composition." In the
design stage, the in-situ gas composition can be assumed based upon
experience. Fluid composition data measured later will be used for
the calibration process.
[0373] Again, the SAG injection volume in Equation (10) excludes
the volume of SAG required to fill up the wellbore. The total
injection volume, which includes the wellbore volume and the volume
that enters the coal seam is preferably significantly greater than
the volume of the wellbore and meets or exceeds the required
penetration distance. Preferably, the total SAG injection volume is
at least twice the volume of the wellbore. More preferably, the
total SAG injection volume is from about 5 times to 20 times the
wellbore volume. Generally, the wellbore volume criterion is not an
operational constraint since a single truck load of CO.sub.2
generally contains 4 or more times the wellbore volume depending
upon the diameter and depth of the well.
[0374] The fluid used for SAG injection preferably contains at
least about 70% (vol.) SAG. More preferably, the injected SAG
contains at least about 85% (vol.) SAG. Most preferably, the
injected SAG contains substantially no WAG. Suitable SAGs are
listed in Table 1. The injected SAG may contain one or more SAGs.
Preferably, however, only one type of SAG is used in the test
procedure.
[0375] During the injection period, the gas injection rates and
composition, surface and bottom-hole pressures and temperatures,
are measured. Bottom-hole pressure and temperature may be monitored
directly in a manner known to those skilled in the art, or
estimated from surface temperature and pressure in a manner known
to those skilled in the art. Preferably, bottom-hole pressure and
temperature are monitored directly.
[0376] Following SAG injection, the well is shut-in for a soak
period sufficient to equilibrate the in-situ gas composition..
During the soak period, surface and bottom-hole pressures and
temperatures are determined. Bottom-hole pressure and temperature
may be monitored directly in a manner known to those skilled in the
art or estimated from surface temperature and pressure in a manner
known to those skilled in the art. Preferably, bottom-hole pressure
and temperature are monitored directly.
[0377] As discussed above under "Calibrating Dynamic Pressure
Strain Component," the length of the shut-in period depends upon
coal diffusivity, which is typically determined by measurement of
the gas volume released from freshly cut coal samples as a function
of time as in GRI-97/0263, Mavor et al. (ibid). As an alternative,
the method described in SPE 20728 (Mavor, M. J. et al., ibid) can
be used to determine the sorption time for SAG at reservoir
temperature, t.sub.S-SAG, from the decline rate in pressure during
sorption isotherm measurements. But, nonetheless, t.sub.S-CBM may
be used as a first order approximation of t.sub.S-SAG for
developing a preliminary estimate of soak time, when time and/or
resources for determining t.sub.S-SAG are not immediately
available.
[0378] Typical coal bed sorption times for CBM are in a range from
about 3 to about 500 hours when measured at reservoir
temperature.
[0379] Preferably, the shut-in period is conducted for at least 0.5
t.sub.s-SAG More preferably, the shut-in period is in a range from
about 0.5 t.sub.s-SAG to about 4 t.sub.s-SAG. Most preferably, the
shut-in period is in a range from about t.sub.S-SAG to about 2
t.sub.s-SAG. Although some sorption times might suggest a shut-in
period of about 1.5 hours, practically, the shortest time for a SAG
shut-in is about 24 hours. Expressed in units of time for
t.sub.S-SAG=t.sub.S-CBM, preferably the SAG shut-in period is at
least about 24 hours. More preferably, the shut-in period is in a
range from about 24 hours to about 80 days. Most preferably, the
shut-in period is in a range from about 24 hours to about 40 days.
As another general guide, the SAG shut-in time is greater than
about 1.5 times the SAG injection time to have sufficient falloff
data for estimating permeability.
[0380] Following the soak period, the well is produced, while
collecting data including, without limitation, produced gas
composition, surface pressure, surface temperature, bottom-hole
pressure, bottom-hole temperature and gas and water production
rates. The length of the production period is preferably in a range
from about 2 days to about 7 days. More specific tests times for
permeability estimates based upon the radius of investigation of
the test can be determined in a manner known to those skilled in
the art. Generally, after a soak period, the, SPS pressure will be
substantially the same as in the initial SPS pressure, so sorption
strain can be evaluated substantially independently from pressure
strain using production data.
[0381] Optionally, a second shut-in period following production may
be conducted to determine the changes in k.sub.eg and k.sub.ew
caused by the SAG. If performed, data collected include, without
limitation, surface and bottom-hole pressures and temperatures.
Again, bottom-hole pressure and temperature may be determined by
monitoring directly in a manner known to those skilled in the art
or by estimating from surface temperature and pressure in a manner
known to those skilled in the art. Preferably, bottom-hole pressure
and temperature are monitored directly.
[0382] Calibrating the dynamic multicomponent sorption strain
component includes determining a SAG production absolute
permeability, k.sub.a-SAG-p, from the data collected. Preferably,
k.sub.a-SAG-p is determined by:
[0383] (1) determining the effective conductivity to gas and the
effective conductivity to water during SAG production;
[0384] (2) determining the coal thickness (previously determined
for calculating k.sub.a-i);
[0385] (3) calculating the SAG production effective permeability to
gas, k.sub.eg-SAG-p, and the SAG production effective permeability
to water, k.sub.ew-SAG-p, by dividing the respective SAG production
effective conductivity from step (1) by the coal thickness from
step (2);
[0386] (4) calculating the SAG production effective gas-water
permeability ratio, k.sub.e-SAG-p
ratio=k.sub.eg-SAG-p/k.sub.ew-SAG-p using the values calculated in
step (3);
[0387] (5) calculating the SAG production relative gas-water
permeability ratio, k.sub.r-SAG-p
ratio(=k.sub.rg-SAG-p/k.sub.rw-SAG-p), which is equal to the
k.sub.e-SAG-p ratio calculated in step (4) because k.sub.a-SAG-p is
the same for both gas and water at a specific test condition;
[0388] (6) determining the corresponding SAG production water
saturation, S.sub.w-SAG-p, SAG production relative permeability to
gas, k.sub.rg-SAG-p, and the SAG production relative permeability
to water, k.sub.rw-SAG-pfor the k.sub.r-SAG-p ratio calculated in
step (5); and
[0389] (7) calculating
k.sub.a-SAG-p=k.sub.eg-SAG-p/k.sub.rg-SAG-p.
[0390] The steps outlined above may be conducted in the same manner
as discussed above for determining k.sub.a-i. As another
alternative, k.sub.a-SAG-p, may be determined from production data,
as discussed below under "Determining Permeability Values from
Production Data."
[0391] The dynamic multicomponent sorption strain component
includes the constrained axial modulus, M, as discussed above. The
bulk modulus, K, is defined by Equation (16): 19 K = M 3 ( 1 + v 1
- v ) ( 16 )
[0392] where
[0393] M constrained axial modulus, psi
[0394] K bulk modulus, psi
[0395] .nu. Poisson's ratio, dimensionless
[0396] The value for M determined for the second principal
component can be used for calibrating the dynamic multicomponent
sorption strain component. However, some SAGs may affect the rock
properties. For example, the inventors recognize that weakening the
coal by SAG sorption may reduce M by changes in E and/or .nu.,
depending on the SAG injected. But, for brevity, changes in the M
value due to gas sorption have not been expressly addressed
quantitatively in Equation (1) because changes are accounted for to
some degree by the sorption strain parameters. However, for greater
accuracy, it is preferable to conduct a second water injection test
after the SAG production test, in order to determine the effect on
rock properties and, therefore the values for M and K used in the
model.
[0397] Alternatively, if data are available relating E and .nu.
(and thus M and K) to sorbed gas composition, the inventors' method
can include these changes explicitly by specifying that
relationship. The calibration would continue to adjust values for
.epsilon. and .phi. until .phi..sub.atm and k.sub.a-atm values are
substantially the same for each test condition.
[0398] Parameters determined by the third principal component
include, without limitation:
7 Parameter Symbol Effective permeability to gas at post-SAG
injection gas k.sub.eg-SAG-p composition and SPS pressure Effective
permeability to water at post-SAG injection gas k.sub.ew-SAG-p
composition and SPS pressure Absolute permeability at post-SAG
injection gas composition k.sub.a-SAG-p and SPS pressure Water
saturation at SPS pressure after SAG-injection S.sub.w-SAG-p Free
and sorbed gas composition following SAG injection Post-SAG
injection SPS pressure p.sub.SAG-p
[0399] As discussed above, an estimate for .phi..sub.SAG-p is used
for calibrating the inventors' model. Techniques for determining an
initial estimate for .phi..sub.SAG-p are discussed more fully
below.
[0400] The values for k.sub.a-SAG-p, M and K are subsequently used
for calibrating the model in the claimed process. Specifically,
k.sub.a-SAG-p is used in Equation (2) to determine k.sub.a-atm.
Also, as discussed more fully below, k.sub.a-SAG-p may be used to
correlate one .phi. estimate for initial .phi. values for other
test conditions. Then the values for .phi..sub.atm and k.sub.a-atm
calculated for the SAG test condition are independently compared to
.phi..sub.atm and k.sub.a-atm values calculated for other test
conditions. Also, the free and sorbed gas composition data are
further used for calibrating the dynamic multicomponent sorption
strain component of the model.
[0401] As discussed more fully below, if the .phi..sub.atm and
k.sub.a-atm values for each test condition are not independently
equal, the initial estimates for .epsilon. and .phi. values are
adjusted and .phi..sub.atm and k.sub.a-atm values are re-calculated
for each test condition. The values for k.sub.a-SAG-p, M and K
calculated above, however, remain fixed for the iterative
computation, which continues until the .phi..sub.atm and
k.sub.a-atm values for each test condition are independently
substantially equal.
[0402] Determining Free & Sorbed Gas Composition
[0403] The free gas composition for each test condition is
determined by analyzing the produced gas composition using
techniques known to those skilled in the art. Suitable techniques
for measuring free gas composition include, without limitation,
collecting gas samples on location in pressurized sample bottles
that are subsequently sent to laboratories for analysis or
measuring gas composition on location with portable gas
chromatographic equipment. Gas samples in sample bottles sent
off-site are typically also analyzed by gas chromatography.
[0404] The gas storage capacity of each individual species of
significant concentration, for example greater than 5 mol. % in the
sorbed gas composition, is calculated according to Equation (17),
using the free gas composition for each respective test condition:
20 G si = G sLi [ 1 - ( w a + w we ) ] py i p Li 1 + j = 1 n y j p
Lj ( 17 )
[0405] where
[0406] G.sub.si storage capacity of component i in a multicomponent
gas, in-situ basis, scf/ton
[0407] G.sub.sLi Langmuir storage capacity of component i in a
multicomponent gas, dry, ash-free basis, scf/ton
[0408] w.sub.a ash content, weight fraction
[0409] w.sub.we equilibrium moisture content, weight fraction
[0410] p.sub.Li, p.sub.Lj Langmuir pressures for component i and j,
respectively, in a multicomponent gas, psia
[0411] y.sub.i, y.sub.j mole fractions of component i and j,
respectively, in the free gas phase, dimensionless
[0412] n number of components in multicomponent gas
[0413] p SPS pressure, psia
[0414] The total gas storage capacity, G.sub.s, for the mixture is
the sum of the gas storage capacity for each component, as
presented in Equation (18): 21 G s = i = 1 n G si ( 18 )
[0415] The concentration of each component in the sorbed gas phase
is computed as the ratio of the component storage capacity to the
total storage capacity as presented in Equation (19). 22 x i = G si
G s ( 19 )
[0416] where
[0417] x.sub.i mole fraction of component i in the sorbed gas
phase, dimensionless
[0418] The dry, ash-free Langmuir storage capacity for each gas
(G.sub.sLi) is determined from core sample analysis or literature
data. Preferably, G.sub.sLi is determined by analysis of core
samples from the coal bed of interest. Techniques for determining
G.sub.sLi are known to those skilled in the art and are typically
conducted on samples equilibrated to equilibrium moisture content
(w.sub.we). For example, see SPE 20728 Mavor, M. J. et al.
ibid.
[0419] The Langmuir pressure, p.sub.L, for each component is the
pressure at which the gas storage capacity for that component is
equal to half the storage capacity at infinite pressure. This
parameter is determined along with G.sub.sL during laboratory
measurements of pure component gas storage capacity.
[0420] The ash content specified in Equation (17) is the in-situ
ash content that corresponds to the average of the coal seam of
interest using techniques known to those skilled in the art. See
GRI-97/0263 (Mavor ibid). Therefore, Equation (17) results in
estimates of the in-situ storage capacity of each gas species.
[0421] The sorbed gas composition data are used for determining
volumetric sorption strain, .epsilon., values, as discussed more
fully below. It is preferable to use .epsilon..sub.i values for
each component of each sorbed gas composition if sorption isotherm
data for each component are available. However, in many cases,
operators do not measure sorption isotherm data for components that
are present in the sorbed gas in an amount of at less than about 5
mol. %. In this situation, however, components of the sorbed gas
composition without isotherm data are preferably at least partially
accounted for by adding the concentration value to the appropriate
main SAG or WAG component. For example, in the illustrative Example
1 below, the inventors added the concentration values for ethane
and propane to the concentration value for CO.sub.2, because the
higher hydrocarbons were also SAGs.
[0422] Selecting Sorption Strain & SPS Porosity Values
[0423] The process claimed herein involves estimating initial
values for volumetric sorption strain, .epsilon., and SPS porosity,
.phi., for each specified test condition. When using atmospheric
pressure as the reference pressure in Equation (1), the value for
.epsilon..sub.atm approaches zero, since substantially no gas is
present in the coal at atmospheric pressure.
[0424] Initial values for .epsilon. and .phi. can be determined in
a number of ways. For example, best-guess estimates may be used for
.phi. for each test condition. And, in order to determine .epsilon.
and .epsilon..sub.atm values for Equation (1), best-guess estimates
may be used for each characteristic sorption strain parameter,
.epsilon..sub..infin.i and p.sub..epsilon.i, for at least each
major component in the sorbed gas composition. As another example,
a best-guess estimate for each .epsilon..sub..infin.i and
p.sub..epsilon.i may be used with reservoir simulation software
known to those skilled in the art to first produce a .phi. estimate
for one or more test conditions. Each of the
.epsilon..sub..infin.i, p.sub..epsilon.i and .phi. estimates can
then be used for calibrating the model. The best-guess estimates
may be adjusted during model calibration.
[0425] However, the number of variables may be reduced by
introducing constraints based on the permeability/porosity
relationship in Equation (2). For example, for two different tests
1 and 2, where the k.sub.a at the test SPS pressure is known for
each test, the ratio of k.sub.a for the two tests constrains the
ratio of the respective .phi. values as demonstrated in Equation
(20). 23 k a1 k a2 ( 1 2 ) 3 ( 20 )
[0426] where:
[0427] k.sub.a1 absolute permeability for a 1.sup.st test
condition, md
[0428] k.sub.a2 absolute permeability for a 2.sup.nd test
condition, md
[0429] .phi..sub.1 SPS porosity for a 1.sup.st test condition,
dimensionless
[0430] .phi..sub.2 SPS porosity for a 2.sup.nd test condition,
dimensionless
[0431] Accordingly, if one .phi. value is known, the other .phi.
value can be estimated from Equation (20). Alternatively, by
estimating one .phi. value, the .phi. values for the other two test
conditions can be correlated through k.sub.a obtained through test
data. The constrained relationship in Equation (20) assists in
reducing the number of variables requiring adjusting when solving
Equations (1) and (2) for .phi..sub.atm and k.sub.a-atm.
[0432] Generally, an initial estimated value for .phi. is in the
range from about 0.0001 to about 0.01. Selecting an initial
estimate for .phi. is based upon the change in permeability and
porosity for a specific test condition. For instance, if
permeability changes are high after injecting SAG, the initial
estimate for .phi..sub.SAG-p should be lower than the initial
estimate for .phi..sub.i.
[0433] As further guidance, .phi. estimates for the first principal
component, and other production and/or shut-in test combinations,
are preferably consistent with the water production volume. Coal
seams that produce larger water volumes generally have greater
.phi. than those that produce smaller water volumes, other factors
being equal. The porosity at SPS pressure is commonly determined
with reservoir simulation models or by material balance analysis.
For example, the value of .phi. at the SPS pressure input to a
simulation model is adjusted until the water production volume is
matched. When determined in this matter, the estimate of .phi. for
the first principal component or other production and/or shut-in
test combinations is fixed in the inventors' iterative calibration
process. Moreover, the correlation in Equation (20) between k.sub.a
data and for .phi. allows for .phi. better estimates for .phi. at
other test conditions, reducing the number of variables requiring
adjustment during calibration. The reservoir simulation derived
estimates of .phi. are generally more accurate than those
determined by material balance, which depends upon assumed water
saturation changes and drainage area. The simulation methods do not
require these assumptions.
[0434] As a further advantage, the .phi. estimates determined in
Equation (20) can be used to constrain the total multicomponent
volumetric sorption strain difference between two test conditions.
For example, Equation (21) may be used to correlate .epsilon. and
.phi. values for different test conditions. 24 1 - 2 = 2 - 1 + p 1
- p 2 M 1 - K M ( 21 )
[0435] where:
[0436] .epsilon..sub.1 total multicomponent volumetric sorption
strain for a 1.sup.st test condition, dimensionless
[0437] .epsilon..sub.2 total multicomponent volumetric sorption
strain for a 2.sup.nd test condition, dimensionless
[0438] .phi..sub.1 SPS porosity for a 1.sup.st test condition,
dimensionless
[0439] .phi..sub.2 SPS porosity for a 2.sup.nd test condition,
dimensionless
[0440] p.sub.1 SPS pressure for a 1.sup.st test condition, psia
[0441] p.sub.2 SPS pressure for a 2.sup.nd test condition, psia
[0442] K bulk modulus, psi
[0443] M constrained axial modulus, psi
[0444] As shown by Equation (5), the total multicomponent
volumetric sorption strain for any test condition is the sum of the
volumetric sorption strain caused by each gas component, each of
which is calculated according to Equation (4), using characteristic
sorption strain parameters .epsilon..sub..infin.i and
p.sub..epsilon.i for each gas component. Preferably, at least three
major gas components, namely, CH.sub.4, WAG and SAG, will be
involved in calibrating the model. Hence, with three gas
components, there will be six sorption strain terms since there are
.epsilon..sub..infin.i and p.sub..epsilon.i terms for each gas
component. Therefore, the number of unknown strain terms can be
reduced to four, by using Equation (21) and fluid composition data,
to calculate two of the .epsilon..sub..infin.i values.
[0445] For example, consider three tests with test 1 being the
initial-condition test, test 2 being a WAG injection test, and test
3 being the SAG production test. Equation (22) can be used to
constrain the .epsilon..sub..infin.-WAG value using the sorption
strain difference between tests 1 and 2. It will be apparent to
those skilled in the art how to expand Equation (22) for more than
three gas components. 25 .infin. - WAG = ( 1 - 2 ) + ( a CH 4 - 2 -
a CH 4 - 1 ) .infin. - CH 4 + ( a SAG - 2 - a SAG - 1 ) .infin. -
SAG a WAG - 1 - a WAG - 2 ( 22 )
[0446] where:
[0447] a.sub.i-c pressure component of sorption strain (i.e.,
strain contribution factor) for component i under test condition c
26 a CH 4 - 1 = p 1 x CH 4 - 1 p - CH 4 1 + p 1 ( x CH 4 - 1 p - CH
4 + x SAG - 1 p - SAG + x WAG - 1 p - WAG ) a CH 4 - 2 = p 2 x CH 4
- 2 p - CH 4 1 + p 2 ( x CH 4 - 2 p - CH 4 + x SAG - 2 p - SAG + x
WAG - 2 p - WAG ) a SAG - 1 = p 1 x SAG - 1 p - SAG 1 + p 1 ( x CH
4 - 1 p - CH 4 + x SAG - 1 p - SAG + x WAG - 1 p - WAG ) a SAG - 2
= p 2 x SAG - 2 p - SAG 1 + p 2 ( x CH 4 - 2 p - CH 4 + x SAG - 2 p
- SAG + x WAG - 2 p - WAG ) a WAG - 1 = p 1 x WAG - 1 p - WAG 1 + p
1 ( x CH 4 - 1 p - CH 4 + x SAG - 1 p - SAG + x WAG - 1 p - WAG ) a
WAG - 2 = p 2 x WAG - 2 p - WAG 1 + p 2 ( x CH 4 - 2 p - CH 4 + x
SAG - 2 p - SAG + x WAG - 2 p - WAG )
[0448] Similarly, the .epsilon..sub..infin.-SAG value can be
constrained by the sorption strain difference between tests 1 and 3
as shown by Equation (23). It will be apparent to those skilled in
the art how to expand Equation (23) for more than three gas
components. 27 .infin. - SAG = ( 1 - 3 ) + ( a CH 4 - 3 - a CH 4 -
1 ) .infin. - CH 4 + ( a WAG - 3 - a WAG - 1 ) .infin. - WAG a SAG
- 1 - a SAG - 3 a CH 4 - 3 = p 3 x CH 4 - 3 p - CH 4 1 + p 3 ( x CH
4 - 3 p - CH 4 + x SAG - 3 p - SAG + x WAG - 3 p - WAG ) a SAG - 3
= p 3 x SAG - 3 p - SAG 1 + p 3 ( x CH 4 - 3 p - CH 4 + x SAG - 3 p
- SAG + x WAG - 3 p - WAG ) a WAG - 3 = p 3 x WAG - 3 p - WAG 1 + p
3 ( x CH 4 - 3 p - CH 4 + x SAG - 3 p - SAG + x WAG - 3 p - WAG ) (
23 )
[0449] The sorbed gas composition and SPS pressure data for each
test condition are used for calculating each strain contribution
factor value in Equations (22) and (23). However, there are two
equations and four unknowns. Accordingly, in order to reduce the
non-uniqueness of the estimated values for
.epsilon..sub..infin.-CH4, p.sub..epsilon.-CH4, p.sub..epsilon.-SAG
and p.sub..epsilon.-WAG, a relative magnitude constraint is
preferably used. Preferably, .epsilon..sub..infin.-CH4 is
constrained by forcing the .epsilon..sub..infin.i values to
increase according to relative storage capacity, i.e.,
.epsilon..sub..infin.-WAG&l-
t;.epsilon..sub..infin.-CH4<.epsilon..sub..infin.-SAG. Likewise,
the relative magnitude of the p.sub..epsilon.1 values preferably
corresponds to the variation observed for sorption isotherm
measurements, i.e.,
p.sub..epsilon.-WAG>p.sub..epsilon.-CH4>p.sub..epsilon.-SAG.
[0450] Solution of this system of equations with Equations (1) and
(2) generally requires iterative methods. Iteration continues until
the values for .phi..sub.atm and k.sub.a-atm are each independently
substantially equal, for example, within 5% for each test
condition.
[0451] As an alternative to using Equations (21)-(23), best-guess
estimates may be used to estimate initial values for
.epsilon..sub..infin.i and p.sub..epsilon.1 for each component for
each test condition. Because swelling and shrinkage, which affect
.epsilon..sub..infin., are related to gas storage capacity,
published sorption isotherm data can be used to guide the initial
selection for .epsilon..sub..infin.i values. For CH.sub.4 and
CO.sub.2 data, for example, the relationships published by Levine
(ibid) can be used as a starting point, with modification.
Specifically, the Levine value for each .epsilon..sub..infin.i
value should be multiplied by the ratio of the component storage
capacity, G.sub.sLi, for the reservoir of interest to the Levine
storage capacity. Mavor et al. (SPE 39105 ibid) list values for
Levine's G.sub.sL for CH.sub.4 and CO.sub.2. As a general rule,
.epsilon..sub..infin.-SAG is, typically about 0.02.
[0452] For other gases, values for .epsilon..sub..infin.i are
increased or decreased relative to their gas storage capacity in
coal, as estimated in Table 1. As a general rule,
.epsilon..sub..infin.-WAG<.epsilon..sub..epsilon.-CH4<.epsilon..sub.-
.infin.-SAG.
[0453] Initial .epsilon..sub..infin.i values should therefore be
increased or decreased accordingly in the direction of the relative
sorptive capacity.
[0454] The Levine p.sub..epsilon.i values can be used, for example,
without modification for a first pass estimate. A moderate value of
p.sub..epsilon.i, such as 500 psia, can also be used as an initial
estimate.
[0455] During iteration, if .phi..sub.atm or k.sub.a-atm for any
test condition is too high compared with .phi..sub.atm and
k.sub.a-atm for other test conditions, the .epsilon..sub..infin.i
value for the most sorptive gas component should be reduced.
Conversely, if .phi..sub.atm or k.sub.a-atm for any test condition
is too low, the .epsilon..sub..infin.i and/or the p.sub..epsilon.i
value for the most sorptive gas component should be increased.
[0456] Determining Permeability Values from Production Data
[0457] Although it is preferable to obtain k.sub.a estimates for
each test condition from conductivity test data as discussed above,
values for k.sub.a, k.sub.e and k.sub.r, can also be obtained from
production data. Specifically, the gas-water production rate ratio
is related to the effective and relative gas-water permeability
ratios by Equation (24). 28 k eg k ew = k rg k rw = 1000 q g 5.615
q w g B g w B w ( 24 )
[0458] where:
[0459] k.sub.eg effective permeability to gas, md
[0460] k.sub.ew effective permeability to water, md
[0461] k.sub.rg relative permeability to gas, dimensionless
[0462] k.sub.rw relative permeability to water, dimensionless
[0463] q.sub.g gas production rate, Mscf/D
[0464] q.sub.w water production rate STB/D (stock tank barrels per
day)
[0465] .mu..sub.g gas viscosity, cp
[0466] B.sub.g gas formation volume factor, in-situ gas
volume/surface gas volume
[0467] .mu..sub.w water viscosity, cp
[0468] B.sub.w water formation volume factor, in-situ water
volume/surface water volume
[0469] The gas and water viscosity and formation volume factor
values are usually obtained from correlations based upon gas and
water composition with methods well known to those skilled in the
art. For example, .mu..sub.g and B.sub.g can be determined with
Huber, M. L. (NIST Thermophysical Properties of Hydrocarbon
Mixtures, NIST Standard Reference Database 4, Standard Reference
Data, National Institute of Standards and Technology, Gaithersburg,
Md.; 1999). The Huber computer program calculates properties of
hydrocarbon gases, N.sub.2 and CO.sub.2 with the Peng-Robinson
equation of state. An example of a suitable reference for
determining .mu..sub.w and B.sub.w Brill, J. P. et al. ("Multiphase
Flow in Wells" Monograph 17, Society of Petroleum Engineers;
1999).
[0470] The relative gas-water permeability ratio can then be used
to determine the corresponding S.sub.w, k.sub.rg and k.sub.rw, for
example, using correlation data in Table 2.
[0471] The effective conductivity to gas, k.sub.egh, can be
determined from the gas production rate and the bottom-hole
pressure with Equation (25): 29 k eg h = q g p sc T R [ ln ( r d r
w ) + s ] 1.987 ( 10 - 5 ) T sc [ m ( P R ) - m ( P w ) ] ( 25
)
[0472] where
[0473] q.sub.g gas rate at standard conditions, Mscf/D
[0474] k.sub.eg effective permeability to gas, dimensionless
[0475] h coal thickness, feet
[0476] T.sub.sc temperature at standard conditions, 519.67.degree.
R (60.degree. F.)
[0477] m(p) real gas potential, psia.sup.2/cp
[0478] P.sub.R reservoir pressure, psia
[0479] P.sub.w bottom-hole pressure, psia
[0480] P.sub.sc pressure at standard conditions, 14.69 psia
[0481] T.sub.R reservoir temperature, .degree. R
[0482] r.sub.d equivalent steady-state drainage radius, feet
[0483] r.sub.w wellbore radius, feet
[0484] s skin factor, dimensionless
[0485] The skin factor, s, is a measure of the near-well resistance
to flow caused by alteration of the near-well absolute or effective
permeability to gas, water, or both. The skin factor is defined by
Equation (26). 30 s = ( k k m - 1 ) ln ( r m r w ) ( 26 )
[0486] where:
[0487] k original permeability, md
[0488] k.sub.m modified permeability, md
[0489] r.sub.m modified region radius, feet
[0490] r.sub.w wellbore radius, feet
[0491] If there is no modification to the near-well permeability, s
is zero. If the near-well permeability is reduced, s is greater
than one. If the well is stimulated, s is less than one.
[0492] There are general rules of thumb for the effect of s on
production rates. For example, when s is about -5, a well will
produce at rates that are approximately 3 to 4 times greater than
when s is zero. And when s is about 7, production rates are roughly
half the rates that could be achieved if s was zero.
[0493] Accordingly, it is possible for those skilled in the art to
estimate reasonable values for s for a CBM reservoir based upon
experience and completion type. For instance, s is expected to be
zero for an open-hole well drilled with water or water and air. An
open-hole well drilled with mud would be expected to have a s value
ranging from about 7 to about 10. But, an open-hole cavity
completion in which an open-hole well is repeatedly allowed to
produce at maximum rates during the completion is expected to
result in a s value of about -3. Finally, hydraulic fracture
stimulation theoretically can cause s values ranging from about -6
to about -4, with an average value of about -5.
[0494] When test data are unavailable, a bottom-hole pressure
estimate for Equation (25) can be estimated from surface pressure
and temperature data in a manner known to those skilled in the art.
The average pressure can be estimated with material balance
methods.
[0495] The geometrical term, 31 ln ( r d r w ) ,
[0496] in Equation (25) is defined in Equation (27). 32 ln ( r d r
w ) = 1 2 ln ( 2.2458 A C A r w 2 ) ( 27 )
[0497] where
[0498] A drainage area, ft.sup.2
[0499] C.sub.A shape factor, dimensionless
[0500] The shape factor, C.sub.A, in Equation (27) depends upon the
shape of the drainage area. Values for C.sub.A are available, for
example, in Advances in Well Test Analysis (Earlougher, R. C.,
Society of Petroleum Engineers of AIME; New York, p. 203-204;
1977). For example, if the well is draining a square drainage area
from a central location within the square, the shape factor is
30.88.
[0501] The real gas potential in Equation (25) accounts for
variation in gas properties with pressure, according to Equation
(28). 33 m ( p ) = 2 p b p p p g z g ( 28 )
[0502] where
[0503] p SPS pressure, psia
[0504] .mu..sub.g gas viscosity, cp
[0505] z.sub.g real gas deviation factor, dimensionless
[0506] Methods for calculating .mu..sub.g and z.sub.g factors in
Equation (28) can be found in literature including, for example,
Whitson et al. ("Phase Behavior," Monograph Volume 20, Henry L.
Doherty Series, Society of Petroleum Engineers; Chapter 3, 2000).
Values can also be calculated with software, such as Huber
(ibid).
[0507] Once values for k.sub.eg and k.sub.rg are determined, an
estimate for k.sub.a for a particular test condition can then be
calculated by dividing the corresponding k.sub.eg by k.sub.rg.
[0508] Using the Calibrated Model
[0509] Calibrating the inventors' model by solving Equations (1)
and (2) results in values for .phi..sub.atm, k.sub.a-atm,
.epsilon..sub..infin.i and p.sub..epsilon.i. Once calibrated,
Equations (1) and (2) are used to compute .phi. and k.sub.a for a
new reservoir condition at SPS pressures above atmospheric pressure
as functions of SPS pressure and fluid composition. The .phi. and
k.sub.a values can ultimately be used for determining the effective
permeabilities to gas and water, for k.sub.eg and k.sub.ew,
respectively, which control movement of gas and water through the
SPS. Accordingly, gas and water injectivity and production rates
can be predicted.
[0510] Preferably, k.sub.eg and k.sub.ew are determined by also
considering the effects on relative permeability, k.sub.r.
Specifically, SPS porosity changes cause changes in water and gas
saturations within the SPS, which in turn lead to changes k.sub.r
and k.sub.e. So, although k.sub.e is the multiplication product of
k.sub.r and k.sub.a, the change in k.sub.e cannot necessarily be
predicted by a change in k.sub.a, without considering the effect on
k.sub.r.
[0511] For example, when a fluid is injected into a coal bed, the
dynamic pressure strain component in Equation (1) increases.
Specifically, the fracture aperture increases, resulting in an
increased pore volume, V.sub.p, in the SPS. But gas does not
effectively displace water upon injection because, for example,
without limitation, gas is much less viscous than water and gas is
less dense than water. Therefore, the water volume, V.sub.w, in the
SPS remains relatively constant while V.sub.p increases. As a
result, the water saturation, S.sub.w, which is the ratio
V.sub.w/V.sub.p, is reduced when .phi. increases.
[0512] FIGS. 2 and 3 illustrate the relationship of various
properties to SPS pressure for a coal seam containing an example
gas composed of 94.42% CH.sub.4, 2.12% CO.sub.2, and 3.46% N.sub.2
on a mole % basis. Specifically, FIG. 2 graphically illustrates the
relationship between k.sub.a, k.sub.ew, k.sub.eg and SPS pressure,
while FIG. 3 graphically illustrates the relationship between
S.sub.w, relative permeability to water, k.sub.rw, relative
permeability to gas, k.sub.rg, and SPS pressure.
[0513] Consider filling the coal by injecting a gas of the above
composition. Initially, sorption strain dominates as CH.sub.4 and
CO.sub.2 cause the coal matrix to swell, which reduces the absolute
permeability from k.sub.a-i=16.2 md to k.sub.a=2.0 md at about 640
psia, as shown in FIG. 2. At greater pressures, the pressure strain
increases k.sub.a to about 39.8 md at 2,500 psia.
[0514] At the same time, as shown in FIG. 3, S.sub.w increases from
0.37 to 0.74 at 640 psia as V.sub.p is initially reduced due to
matrix swelling. But, as the fracture aperture increases (i.e.,
V.sub.p increases), S.sub.w is reduced from 0.74 at about 640 psia
to 0.27 at 2,500 psia. The decrease in S.sub.w, reduces k.sub.rw,
and increases k.sub.rg.
[0515] The curve for k.sub.rw in FIG. 3 follows the same general
trend as the curve for S.sub.w increasing from 0.040 at atmospheric
pressure to 0.30 at about 640 psia. Thereafter, k.sub.rw, decreases
to 0.019 at 2,500 psia. Conversely, k.sub.rg decreases initially
from 0.32 at atmospheric pressure to 0.075 at about 640 psia and,
thereafter, increases to 0.44 at 2,500 psia. So, the trends for
changes k.sub.rw and k.sub.rg were generally similar but opposite
to each other. However, the changes in k.sub.ew were surprisingly
relatively small since decreases in S.sub.w and, therefore
k.sub.rw, are almost equally offset by the increase in k.sub.a due
to ballooning. As shown in FIGS. 2 and 3, changes in k.sub.eg
parallel the k.sub.a changes as the decrease in S.sub.w increases
the k.sub.rg at the same time that k.sub.a is increased by
ballooning.
[0516] Specifically, as illustrated in the example in FIG. 2,
k.sub.ew is relatively constant, ranging from 0.649 md to 0.581 md,
in the pressure range from atmospheric to 1,500 psia, thereafter
increasing gradually and slightly to 0.76 md at 2,500 psia.
Accordingly, gas. injection has little effect on k.sub.ew. However,
gas injection has a significant effect on k.sub.eg. While k.sub.eg
follows the same general trend vs. SPS pressure as does k.sub.a,
the magnitude of the changes in k.sub.eg are not as large since the
presence of water causes k.sub.eg to be less than k.sub.a.
Specifically, k.sub.eg initially decreases from 5.25 md at
atmospheric pressure to 0.15 md at about 640 psia. Thereafter,
k.sub.eg increases to 17.4 md at 2,500 psia. FIGS. 2 and 3
therefore illustrate that gas and water flow in a coal bed cannot
be determined from k.sub.a alone.
[0517] Accordingly, k.sub.eg and k.sub.ew are preferably determined
by considering effects on k.sub.r, first, by determining the water
saturation at atmospheric pressure, S.sub.w-atm, and then
determining S.sub.w for a pre-selected SPS pressure/fluid
composition condition. S.sub.w-atm can be estimated from the water
saturation at a test condition pressure. For instance, S.sub.w-atm
for the initial condition is determined with Equation (29): 34 S w
- atm = S w - i i atm ( 29 )
[0518] where
[0519] S.sub.w-atm water saturation at atmospheric pressure,
dimensionless
[0520] S.sub.w-i water saturation at initial SPS pressure,
dimensionless
[0521] Once S.sub.w-atm is known, the water saturation, S.sub.w,
can be determined for a pre-selected SPS pressure/fluid composition
condition by dividing S.sub.w-atm by a normalized SPS porosity
determined for the pre-selected condition using Equation (1), as
shown by Equation (30). 35 S w = S w - atm atm ( 30 )
[0522] where
[0523] S.sub.w water saturation, dimensionless
[0524] The S.sub.w value can then be used to determine k.sub.rg and
k.sub.rw for ultimately determining k.sub.eg and k.sub.ew. As shown
by Equations (31) and (32), the effective permeability is the
product of the absolute permeability and the relative
permeability.
k.sub.eg=k.sub.rgk.sub.a (31)
k.sub.ew=k.sub.rwk.sub.a (32)
[0525] where
[0526] k.sub.eg effective permeability to gas, md
[0527] k.sub.rg relative permeability to gas, dimensionless
[0528] k.sub.a absolute permeability, md
[0529] k.sub.ew effective permeability to water, md
[0530] k.sub.rw relative permeability to water, dimensionless
[0531] Values for k.sub.rg and k.sub.rw are estimated as a function
of S.sub.w using relative permeability data, such as the data
presented in Table 2 above. The relative permeability data are
obtained by either measurement on core samples, by analysis of
production behavior during the life of the reservoir, or from
literature data.
[0532] Thus, the inventors' calibrated model can be used to predict
permeability for conditions other than for those used to calibrate
the model. In this way, the model can therefore be used to predict
gas and water flow through the reservoir or to predict injection
pressures or rates. Moreover, the model can be used to predict
permeability for different injected and/or produced fluid
compositions. This is particularly useful for ECBM and
sequestration processes.
[0533] For example, once k.sub.eg is calculated with Equation
(31),,the injection rate for different gas compositions can be
predicted with Equation (33), a form of Darcy's Law. 36 q g = 1.987
( 10 - 5 ) k eg hT sc [ m ( P R ) - m ( P w ) ] p sc T R [ ln ( r d
r w ) + s ] ( 33 )
[0534] where
[0535] q.sub.g gas production rate at standard conditions,
Mscf/D
[0536] k.sub.eg effective permeability to gas, dimensionless
[0537] h thickness, feet
[0538] T.sub.sc temperature at standard conditions, 519.67.degree.
R (60.degree. F.)
[0539] m(p) real gas potential; psia.sup.2/cp
[0540] P.sub.R reservoir pressure, psia
[0541] P.sub.w bottom-hole pressure, psia
[0542] p.sub.sc pressure at standard conditions, 14.69 psia
[0543] T.sub.R reservoir temperature, .degree. R
[0544] r.sub.d equivalent steady-state drainage radius, feet
[0545] r.sub.w wellbore radius, feet
[0546] s skin factor, dimensionless
[0547] The geometrical term, 37 ln ( r d r w ) ,
[0548] in Equation (33) is defined in Equation (27), above, while
m(p) is defined in Equation (28) and s is defined in Equation
(26).
[0549] Use of Equation (33) for predicting the injection rate for a
50/50 mixture of CO.sub.2 and N.sub.2 is illustrated in Example 2
below.
[0550] For fluid compositions containing a different SAG or WAG not
considered in the tests, it may be possible to estimate the
characteristic sorption strain parameters for the different
component using the tested SAG or WAG characteristic sorption
strain parameters determined by solving Equations (1) and (2). As
another alternative, sorption strain parameters may be determined
by interpolating the results for WAG-CH.sub.4-SAG. It may also be
possible to determine a multiplier for adjusting the characteristic
sorption strain parameters for a known SAG or WAG by correlating
sorption strain capacity or some other relevant parameter. However,
for greater accuracy, it is preferable to conduct another test for
the different SAG or WAG component. Preferably, there is at least
one test for each major fluid component in a pre-selected fluid
composition.
[0551] Effective Conductivity Tests
[0552] As discussed above, the effective conductivity to gas and
the effective conductivity to water used for determining absolute
permeability may be determined from, for example, without
limitation, a shut-in test, an interference test, a production
test, a production test combined with a water injection/fall-off
test, a production test combined with a gas injection/fall-off
test, or a production test combined with a water slug test. These
tests are generally known to those skilled in the art. However, for
convenience, a brief description of each test is provided
below.
[0553] In a production test, a well is placed on production at a
substantially constant total (gas and water) production rate from a
static reservoir pressure condition. The production period is
preferably in a range from about 1 week to several months. During
production, the bottom-hole pressure decreases proportionally to
the logarithm of time. The rate of pressure decrease is
proportional to the inverse of the total mobility. Total mobility,
.lambda..sub.T, is defined in Equation (34): 38 T = k a ( k rg g +
k rw w ) ( 34 )
[0554] When a shut-in test (also referred to as a pressure,
build-up test) is used in conjunction with a production test, the
well is shut-in following production. The shut-in time is
preferably in a range from about 1 to about 2 times the production
period duration. As a result of shut-in, the bottom-hole pressure
increases proportionally to the logarithm of time. The rate of
pressure increase is proportional to the inverse of the total
mobility.
[0555] A combined production/shut-in test is usually successful in
moderate (5 to 20 md) to high permeability (>20 md) CBM
reservoirs.
[0556] In low permeability CBM reservoirs (.ltoreq.5 md),
production rates may be too low or wellbore storage effects may
preclude accurate analysis of the shut-in test data. As a result,
gas or water injection/fall-off tests are preferably used in low
permeability reservoirs and should be carefully conducted to avoid
altering the original absolute permeability. Water injection rates
should be relatively low for example, from about 1 gallon/minute to
about 10 gallons/minute. Even with a low water injection rate, the
absolute permeability may be altered during the injection portion
of the test. During the fall-off portion of the test, the wellbore
pressure declines back to the pre-injection reservoir pressure.
Accordingly, more accurate estimates of the original absolute
permeability are obtained from effective conductivity data
determined during the fall-off portion of the test.
[0557] Interference tests involve multiple wells. Generally one
well is an active well and is placed on production at a relatively
constant total rate. The second well is an observation well that is
not produced but in which bottom-hole pressure is measured with
sensitive pressure transducers as a function of time. The rate of
pressure change in the observation well is proportional to the
logarithm of time and inversely proportional to the total mobility.
More than one observation well can be used and results in estimates
of effective conductivity distributions rather than just a single
value.
[0558] If used, an interference test is preferably conducted prior
to SAG injection. If an interference test is used after SAG
injection starts, the test should be conducted before the injected
SAG has reached the observation well. More specifically, the
interference test should be conducted before the injected SAG front
is less than approximately half the distance between the injection
well and the observation well.
[0559] Water injection tests are commonly performed in coal seams.
This test involves injecting water at a low constant rate (i.e.
gallons per minute) for a period of time. Injection is usually
performed with low volume, high-pressure pumps commonly available
in the industry. The pressure data behave similarly to a production
test except bottom-hole pressure increases rather than decreases
during the test. A water injection test can be followed by a
falloff test during which injection is halted. The fall-off test
pressure data behave similarly to a shut-in test except that
bottom-hole pressure decreases rather than increases.
[0560] Slug tests are variations on water injection tests and are
performed in reservoirs that have an average pressure that is less
that the hydrostatic head of water to surface. In this test, a
"slug" of water is rapidly poured into the well. The water level in
the well slowly decreases until the hydrostatic head of the water
is equal to the reservoir pressure.
[0561] Gas injection tests are less common than water injection
tests due to higher costs. These tests usually involve injecting
N.sub.2 using hydraulic fracture stimulation equipment. As in the
case of a water injection test, bottom-hole pressure increases
during injection and decreases when injection ceases. During gas
injection, the gas rates should be relatively low, for example,
from about 500 to about 1,000 scf/minute. The rate may alter
k.sub.a and, therefore, the gas fall-off portion of the test should
provide a more accurate estimate of the original k.sub.a. Gas
injection tests can be conducted when the SPS is completely filled
with water. Injection increases the near-well SPS pressure that in
turn decreases the near-well gas saturation allowing sufficient
effective permeability to gas for injection.
[0562] Various combinations of these tests are possible. The
selected variation depends upon the production type (i.e. gas
and/or water productive), and the reservoir pressure, among other
parameters.
[0563] Test Procedures
[0564] The claimed process may be applied to a single well or to
multiple wells. In a single well test, the injection and production
test conditions are conducted at the same well. When two or more
wells are used, the injection test may be performed in one or more
wells and the production test may be performed in one or more other
different wells. Alternatively, injection and production tests may
be conducted at each well. Preferably,, the claimed process is used
with two or more wells in the same coal seam. More preferably, the
injection and production tests are conducted in the same well. Most
preferably, both the injection and production tests are performed
in each of two or more different wells, since coal seams are
heterogeneous. When two or more wells are used, the wells are
preferably in close proximity to each other. For example, typical
production inter-well spacing ranges, from about 0.25 to about 0.7
miles. In some special cases involving interference tests, wells
could be within about 100 to about 200 feet of each other.
[0565] The test procedures may be applied to new wells or to
existing injection or production wells. In the event that an
existing well is used, fluid composition data is mostly likely
available from earlier production. The existing well is then
shut-in to provide the estimates for effective and absolute
permeability, S.sub.w, and the average SPS pressure. The properties
determined at for the existing well after shut-in are the values
that are used for the initial test conditions described above under
"Determining Initial Absolute Permeability." As a further
advantage, the shut-in also allows pressures and fluid compositions
to equilibrate prior to injecting a test fluid.
[0566] As discussed above, the dynamic pressure strain component is
calibrated by injecting a fluid at a pressure greater than P.sub.R.
The injection fluid is preferably water or WAG. More preferably,
the injection fluid is water. Most preferably, the dynamic pressure
strain component is calibrated by first injecting water, and then
injecting a WAG.
[0567] Because coal seams exhibit heterogeneities, the porosity and
permeability may be different for different wells. Where
differences exist and multiple wells are used, average values for
.phi..sub.atm and k.sub.a-atm should be used in subsequent porosity
and permeability predictions for portions of the coal bed further
away from the test wells.
[0568] Preferred procedures for conducting single well and multiple
well tests, using tests and analyses described more fully above,
are now outlined, for an example of using water and WAG as
injection fluids in the injection tests and a SAG production test.
When each well in a multiple well test is used for both SAG and WAG
injection, then the single well test procedure should be used for
each well.
[0569] Single Well Test Procedure
[0570] In a single well test, WAG injection may be followed by SAG
injection or SAG injection may be followed by WAG injection.
However, because SAG causes coal to swell, water and/or WAG is
preferably injected prior to SAG.
[0571] 1. For a shut-in well, measure the initial P.sub.R and
reservoir temperature, T.sub.R, before production or injection
begins. P.sub.R and T.sub.R are typically measured by running a
pressure/temperature transducer on wireline to the depth of the
completed reservoir of interest. If the well is on production,
shut-in the well and determine initial (average) pressure and
temperature during Step 2 below.
[0572] 2. Conduct tests to estimate k.sub.a-i at the original
in-situ gas composition without altering P.sub.R and T.sub.R. As
discussed more fully above, under "Determining Initial Absolute
Permeability," k.sub.a-i is preferably estimated by determining the
effective conductivity to gas, the effective conductivity to water
and the coal thickness.
[0573] 3. If, in Step 2, a combined production/shut-in test was
used to determine effective conductivity, the well is preferably
reconfigured with an injection string (a packer set downhole on
tubing which is landed in the wellhead) and a wellhead is
installed. However, the wellbore configuration can remain the same
as for the production/shut-in test. If a water injection test was
used to determine effective conductivity, the same wellbore
configuration used for the water injection test can be used for
Step 4.
[0574] 4. Inject water into the wellbore and follow it with a
falloff (shut-in) period. Preferably, the injection pressure is
less than the fracture extension pressure, P.sub.E. More
preferably, water is injected at a pressure less than the fracture
pressure, P.sub.F. The injection and falloff periods should be
performed for sufficient time and volume to account for wellbore
storage effects.
[0575] 5. Inject a WAG into the wellbore. Preferably, the injection
pressure is less than the fracture extension pressure, P.sub.E.
More preferably, WAG is injected at a pressure less than the
fracture pressure, P.sub.F. The injection period should be
performed for sufficient time and volume to account for wellbore
storage effects and to obtain the desired WAG sorption area.
[0576] 6. Shut in the wellbore for the soak period. Preferably, the
length of the soak period is based upon sorption times as
previously discussed under "Calibrating Pressure Strain Component."
More preferably, the soak period is at least about 1.5 times the
length of the injection period so that estimates of the average
pressure, effective conductivity to gas and water, and water
saturation after injection can be obtained. The well may be shut-in
downhole or at the wellhead. Preferably, the well is shut-in
downhole to reduce wellbore storage effects. For example, the well
may be shut-in by setting a plug on wireline into a nipple located
above the pressure transducer monitoring position.
[0577] 7. Unseat the packer and remove the injected fluid from the
wellbore. Injected fluid is removed from the wellbore so that the
composition of the gases produced in Step 10 is representative of
the stabilized composition in the SPS. Preferably, the injected
fluid is removed by circulating completion fluid in such a way that
the bottom-hole pressure during circulation is just slightly
greater than P.sub.R. Suitable completion fluids include, without
limitation, water for normal-pressured or under-pressured
reservoirs, and sodium chloride, potassium chloride, or calcium
chloride brines for over-pressured reservoirs. If the reservoir is
under-pressured, (i.e., P.sub.R is less than the hydrostatic head
of water to surface) water will be lost to the reservoir during and
after circulation. Water lost to the reservoir will not compromise
the test procedure.
[0578] 8. Install downhole production equipment. Preferably,
downhole production equipment is installed without allowing the
well to produce. However, small amounts of production can be
tolerated during this step. In over-pressured reservoirs, this step
may not be necessary and the injection packer can remain in the
seated position or be unseated allowing production up either the
tubing, tubing-casing annulus, or both. In normal- or
under-pressured reservoirs, the completion fluid will usually
prevent the well from flowing. The injection string is removed from
the wellbore and a production string, including tubing, and a
downhole pump, is installed in the wellbore. Preferably, a pressure
transducer is also installed so that the bottom-hole pressure can
be monitored directly. Alternatively, bottom-hole pressure during
production can be estimated from surface pressure and the height of
water or completion fluid remaining in the wellbore with methods
known to those skilled in the art.
[0579] 9. Conduct a soak period to allow the near-well free gas
composition to reach equilibrium with the sorbed gas composition.
The duration of this soak period is discussed above under
"Calibrating Pressure Strain Component."
[0580] 10. Return the well to production. During the production
period, bottom-hole pressure and temperature, surface pressure and
temperature, surface gas and water production rates, and gas and
water composition are determined as a function of time. The
duration of the production time is discussed above under
"Calibrating Pressure Strain Component."
[0581] 11. Optionally, shut-in the well for sufficient time to
obtain data required for post-WAG injection permeability
estimates.
[0582] 12. Reconfigure the well for injection if necessary. For an
over-pressured reservoir, this step may not be required if the
injection packer was not unseated. If the packer was unseated, it
will have to be reseated. Reseating will often require that
completion fluid is circulated to increase the wellbore pressure to
a pressure greater than P.sub.R so that the wellhead can be safely
removed. For a normal- or under-pressured reservoirs, the well will
often have to be circulated with completion fluid (i.e., water) so
that the wellhead and production equipment can be safely removed.
The injection string including the packer and pressure transducer
will be rerun into the well. The packer will be seated and the
wellhead reinstalled.
[0583] 13. Inject a SAG into the wellbore. Preferably, the
injection pressure is less than the fracture extension pressure,
P.sub.E. More preferably, SAG is injected at a pressure less than
the fracture pressure, P.sub.F. The injection period should be
performed for sufficient time and volume to account for wellbore
storage effects and to obtain the desired SAG sorption area
[0584] 14. Repeat Step 6.
[0585] 15. Repeat Step 7.
[0586] 16. Repeat Step 8.
[0587] 17. Conduct a soak period to allow the near-well free gas
composition to reach equilibrium with the sorbed gas composition.
The duration of this soak period is discussed above under
"Calibrating Sorption Strain Component."
[0588] 18. Return the well to production. During the production
period, bottom-hole pressure and temperature, surface pressure and
temperature, surface gas and water production rates, and gas and
water composition are determined as a function of time. The
duration of the production time is discussed above under
"Calibrating Sorption Strain Component."
[0589] 19. Optionally, shut-in the well for sufficient time to
obtain data required for post-SAG injection permeability
estimates.
[0590] 20. Optionally, conduct a final water injection/fall-off
test in the manner described above under "Effective Conductivity
Tests."
[0591] Multiple Well Test Procedure
[0592] The use of multiple wells can reduce the time required for
collecting data because WAG and SAG injection tests can be
performed concurrently. However, k.sub.a-i is preferably determined
independently for each well, due to heterogeneity in the coal seam.
As stated above, if multiple wells are used, but SAG and WAG are
injected into each well, then the procedure under "Single Well Test
Procedure" should be used for each well. The procedure outlined
below is used when WAG is injected in one or more wells and SAG in
injected in one or more different wells.
[0593] WAG Well Test Procedure
[0594] See Steps 1-11 under "Single Well Test Procedure."
Optionally, additionally, conduct a final water injection/fall-off
test in the manner described above under "Effective Conductivity
Tests."
[0595] SAG Well Test Procedure
[0596] See Steps 1-11 under "Single Well Test Procedure" with the
exception that SAG is injected rather than WAG in Step 5. In Steps
6 and 9, use sorption times discussed under "Calibrating Sorption
Strain Component." Optionally, additionally, conduct a final water
injection/fall-off test in the manner described above under
"Effective Conductivity Tests."
[0597] The following non-limiting examples of embodiments of the
present invention that may used as claimed herein are provided for
illustrative purposes only.
EXAMPLE 1
[0598] Example 1 illustrates how the inventors' model described in
Equation (1) can be calibrated. However, it should be noted that
the data were collected before the inventors' model and method were
developed. Accordingly, this example is not the most preferred
method for calibrating the inventors' model. But, even though the
data was not collected by the preferred method, Example 1
illustrates how even less than preferred information can be used
successfully to predict permeability and porosity changes.
[0599] Well test data was collected from two wells located near the
town of Big Valley, Alberta, Canada. Both wells in this example
were completed in an Upper Medicine River Coal seam located in the
Mannville Formation at depths between 4,117 ft. and 4,130 ft. below
the surface. The first well was used to calibrate the dynamic
multicomponent sorption strain component of the model. The second
well was used to calibrate the dynamic pressure strain component of
the model.
[0600] First Well (FBV 4A)
[0601] The first well was the FBV 4A-23-36-20 W4M (FBV 4A) well
located 3 km (1.9 mi) north of Big Valley. An initial combined
production/shut-in test was conducted to obtain estimates of
P.sub.R, initial effective conductivities, and initial gas
composition. Following these test procedures, CO.sub.2 was injected
into the formation through the FBV 4A well. The well was returned
to production after a soak period. P.sub.R, post-SAG effective
conductivities and post-SAG gas composition estimates were
determined with a second combined production/shut-in test.
[0602] The initial production/shut-in test data were evaluated
using the method described above under "Determining Initial
Absolute Permeability." This analysis resulted in estimates for the
initial pressure, P.sub.R (1,146 psia), the effective conductivity
to gas, k.sub.eg-ih (6.93 md-ft), and the effective conductivity to
water, k.sub.ew-ih (7.51 md-ft). Analysis of density log data
determined that the coal thickness (h) was 13.1 ft. Accordingly,
dividing the respective initial effective conductivity estimates by
the coal thickness resulted in k.sub.eg-i (0.529 md) and k.sub.ew-i
(0.573 md) estimates. The initial effective gas-water permeability
ratio, k.sub.eg-i/k.sub.ew-i, was therefore 0.923 (0.529/0.573).
Because k.sub.a-i i is the same for both gas and water, the initial
relative permeability ratio, k.sub.rg-i/k.sub.rw-i, was equal to
k.sub.eg-i/k.sub.ew-i, 0.923. Using k.sub.rg-i/k.sub.rw-i and
interpolating the data in Table 2 above, S.sub.w-i, k.sub.rg-i and
k.sub.rw-i were determined to be 0.60, 0.145, and 0.158,
respectively. The initial absolute permeability k.sub.a-i was
determined by dividing k.sub.eg-i, 0.529 md, by k.sub.rg-i, 0.145,
to obtain a value of 3.66 md.
[0603] During the production portion of the initial
production/shut-in test, the initial produced gas composition was
analyzed by gas chromatography and determined to be 92 mol. %
CH.sub.4, 1.5 mol. % CO.sub.2, 5 mol. % N.sub.2, and 1.5 mol. %
ethane (C.sub.2H.sub.6) plus propane (C.sub.3H.sub.6). Although
this initial gas composition could have been used for calibrating
the inventors' model, it was more accurate to use the initial gas
composition from the second well because the composition produced
from the FBV 4A well had been contaminated by CO.sub.2 injection
during hydraulic fracturing and two N.sub.2 injections early in the
well life. Nonetheless, the inventors expect that the contaminated
gas composition data could have been used with little effect upon
the permeability estimates or the strain parameters.
[0604] A total of 3.290 MMscf of CO.sub.2 (SAG) were injected into
the well in 12 separate injection periods over 22 days. Of this
total, 3.23 MMscf entered the coal seam and 0.06 MMscf remained in
the wellbore. The injected CO.sub.2 was contained within an area of
0.384 acres. If the CO.sub.2 swept area was a circle, the edge of
the CO.sub.2 front would have been 73 feet from the well. The FBV
4A was then shut-in for a 40-day soak period to allow the in-situ
post-SAG gas composition to stabilize.
[0605] The FBV 4A well was returned to production to perform a
combined production/shut-in test. The well was produced for 59
days. The post-SAG produced gas composition was determined by gas
chromatography. At the beginning of production, the post-SAG
produced gas composition was 30.5 mol. % CH.sub.4, 68.2 mol. %
CO.sub.2, 0.9 mol. % N.sub.2, and 0.3 mol. %
C.sub.2H.sub.6+C.sub.3H.sub.8. CO.sub.2 concentration decreased
with continued production while CH.sub.4,
C.sub.2H.sub.6+C.sub.3H.sub.8, and N.sub.2 concentration increased.
At the end of the production period, the post-SAG produced gas
composition was 62.3 mol. % CH.sub.4, 34.0 mol. % CO.sub.2, 2.5
mol. % N.sub.2, and 1.2 mol. % C.sub.2H.sub.6+C.sub.3H.sub.- 8. The
post-SAG produced gas composition from the end of the production
period was used as the post-SAG free gas composition for purposes
of estimating the corresponding sorbed gas composition and sorption
isotherm parameters using Equations (17), (18), and (19). The
post-SAG free gas and sorbed gas compositions are presented below
in Table 5.
[0606] The FBV 4A well was then shut-in and the shut-in pressure
data were evaluated in a similar manner as for the test conducted
before CO.sub.2 injection. P.sub.R was unchanged by injection and
remained at 1,146 psia. Estimates of the effective conductivity to
gas after SAG injection, k.sub.eg-SAG-ph, and the effective
conductivity to water after SAG injection, k.sub.ew-SAG-ph, were
2.23 and 1.57 md-ft, respectively. The effective permeability to
gas and water were determined by dividing by the coal thickness of
13.1 ft, resulting in k.sub.eg-SAG-p equal to 0.17 md and
k.sub.ew-SAG-p equal to 0.12 md. The corresponding effective gas to
water permeability ratio, k.sub.eg-SAG-p/k.sub.ew-SAG-p, was 1.42
(0.17/0.12). Because k.sub.a-SAG-p is the same for both gas and
water, k.sub.rg-SAG-p/k.sub.rw-SAG-p was also equal to 1.42. Using
k.sub.rg-SAG-p/k.sub.rw-SAG-p and interpolating the data in Table 2
above, S.sub.w-SAG-pi, k.sub.rg-SAG-p, and k.sub.rw-SAG-p were
determined to be 0.56, 0.173, and 0.124, respectively. The absolute
permeability after SAG injection, k.sub.a-SAG-p was determined by
dividing k.sub.eg-SAG-p, 0.17 md, by k.sub.rg-SAG-p, 0.173, to
obtain a value of 0.98 md.
[0607] Second Well (FBV 5)
[0608] The second well was the FBV 5-23-36-20 W4M (FBV 5) located
493 m (1,617 ft) north of the FBV 4A well. Core samples, density
log data and a primary production test were used to obtain Langmuir
isotherm data, coal thickness, P.sub.R, effective conductivities
and initial gas composition data. The well was then shut-in and
then N.sub.2 (WAG) was injected. The well was shut-in and then
returned to production.
[0609] The FBV 5 well was cored while drilling to obtain fresh
samples for coal property measurements. In particular, measurements
of sorption isotherm data were obtained to predict sorbed gas
composition and storage capacity. The core samples were analyzed by
TerraTek, Inc., Salt Lake City, Utah, U.S.A., using the procedures
described in Mavor et al. (SPE 20728, ibid). The Langmuir
parameters from these measurements are summarized in Table 3.
8TABLE 3 Parameter Units CH.sub.4 CO.sub.2 N.sub.2 In-Situ Langmuir
Storage Capacity (G.sub.si) scf/ton 376.8 772.1 373.6 Langmuir
Pressure (p.sub.Li) psia 680 276 3,951
[0610] After drilling through the coal seams, the FBV 5 well was
logged. Interpretation of the density log data indicated that the
coal seam thickness was very similar to that penetrated by the FBV
4A well, 4.0 m (13.0 ft).
[0611] The FBV 5 well was placed on production for 28 days. Surface
and bottom-hole temperature and pressure data, gas and water
production rate data, as well as initial gas composition, were
determined. The initial produced gas contained 94.42 mol. %
CH.sub.4, 0.26 mol. % CO.sub.2, 3.46 mol. % N.sub.2, 1.53 mol. %
C.sub.2H.sub.6, and 0.33 mol. % C.sub.3H.sub.8 and heavier
hydrocarbon fractions. This initial gas composition was believed to
be more reliable than the FBV 4A initial gas composition data since
no gases had been injected into the FBV 5 well before this
composition was determined. As shown in Table 5, the FBV 5 initial
produced gas was used as the initial free gas composition for both
the FBV 4A and FBV 5 tests.
[0612] Gas and water production rates were 4 Mscf/D and 8 STB/D,
respectively. In this case, the k.sub.rg-i/k.sub.rw-i ratio was
determined from production data, as discussed above under the
section entitled "Determining Permeability Values from Production
Data," using Equation (24). Values for .mu..sub.g and B.sub.g were
computed using the Huber (ibid) computer program, resulting in
values of 0.0136 cp and 0.0131, respectively. The corresponding
water values, determined from Brill et al. (ibid), were 0.614 cp
(.mu..sub.w) and 1.0 (B.sub.w), respectively. Using these values in
Equation (24), k.sub.rg-i/k.sub.rw-i was calculated to be 0.0258.
Interpolation of Table 2 above resulted in estimates of S.sub.w-i,
k.sub.rg-i, and k.sub.rw-i of 0.910, 0.016, and 0.628,
respectively. These data were used in combination with later data
to obtain absolute permeability estimates.
[0613] Following production, the FBV 5 well was shut-in to obtain
data suitable for permeability and pressure estimates. However,
because the well was shut-in at the surface and the coal seam was a
low permeability coal (see "Effective Conductivity Tests" above),
wellbore effects dominated the pressure behavior and the data were
not suitable for analysis. As a result, a water injection-falloff
test was performed to estimate the absolute permeability at the
initial reservoir pressure. From the water injection-falloff test,
k.sub.ew was determined from the falloff data to be 0.735 md. This
estimate was obtained as P.sub.R returned to the initial pressure
and, therefore, was believed to be a reliable indicator of the
effective permeability to water, k.sub.ew-i, during the preceding
production period. The water injection-falloff test was also used
to determine a value for M, as discussed more fully below.
[0614] In some cases, water can effectively displace gas, but in
this test the inventors assumed that water did not displace gas,
since the gas saturation before water injection was only 0.09. At
such a low gas saturation, it was possible that injected water did
not enter the relatively small portion of the SPS occupied by gas.
As a result, rather than using water permeability values, the
inventors estimated the absolute permeability at the initial
pressure, k.sub.a-i, by dividing the effective permeability to
water k.sub.ew-i (0.735 md), by the relative permeability to water
determined from the production rates, k.sub.rw-i, (0.628), to
obtain an estimate of 1.2 md for k.sub.a-i for the FBV 5 well. The
corresponding k.sub.eg-i was 0.019 md, calculated by the product of
k.sub.rg-i (0.016) and k.sub.a-i (1.2 md).
[0615] The injection portion of the water injection test was used
to obtain estimates of the constrained axial modulus, M. The
pressure at the end of the injection period was 1,925 psia.
Analysis of the injection data resulted in an estimate of the
effective permeability to water, k.sub.ew-H2O-inj, equal to 5.45
md. As the gas saturation was low, the inventors assumed that water
did not enter the pore spaces where gas was present and displace
gas. However, while the gas volume may have been constant, the
porosity was increased resulting in a smaller gas saturation and
greater effective permeability to water. The gas saturation during
injection can be estimated with Equation (35). 39 S g - 2 = S g - 1
1 2 = S g - 1 ( k a - 1 k a - 2 ) 1 3 ( 35 )
[0616] where
[0617] S.sub.g-1 gas saturation before injection, fraction of SPS
volume
[0618] S.sub.g-2 gas saturation during injection, fraction of SPS
volume
[0619] k.sub.a-1 absolute permeability before injection, md
[0620] k.sub.a-2 absolute permeability during injection, md
[0621] Equation (35) can be solved iteratively for k.sub.a-2 and
S.sub.w during injection. For example, if k.sub.rw during injection
was initially assumed to be one, k.sub.a-2 becomes 5.45 with
k.sub.a-1 of 1.2 md. Therefore the gas saturation during injection,
S.sub.g-2, was 0.0543. At this gas saturation, k.sub.rw was 0.7198
based upon Table 2. Therefore, k.sub.a-2 became 7.57 md and
S.sub.g-2 became 0.04878. Iteration for this example continued
until S.sub.g-2 became 0.0493, k.sub.rw became 0.733 and k.sub.a-2
became 7.43 md. The final porosity ratio (.phi..sub.2/.phi..sub.1)
was 1.836 indicating that the porosity during water injection was
0.0022.
[0622] As discussed earlier, the absolute permeability during an
injection test occurs at an average of the pressure within a region
affected by the injection test. It would be possible to estimate
precisely this pressure by integrating pressure distributions
surrounding the injection well that are calculated, for example,
with a reservoir simulator. For brevity in this example, the
inventors chose to approximate the average pressure within the
affected region by the average of the bottom-hole pressure at the
end of injection and the reservoir pressure. For this example, with
a final bottom-hole injection pressure of 1,943 psia and a
reservoir pressure of 1,146 psia, the pressure corresponding to
7.43 md is 1,545 psia.
[0623] Combining the absolute permeability estimates obtained
during and after water injection (7.43 and 1.2 md, respectively) at
an average pressure, {overscore (p)}.sub.inj, of 1,545 psia and the
porosity estimate obtained from the water production data (0.0012
as discussed later) allowed M to be estimated with Equation (15).
The resulting estimate was 397,600 psi. If a value for .nu. is
assumed (such as 0.21 published by Mavor and Vaughn (ibid)), a
value for E can be estimated. For this example, E was 353,210 psi
based upon a .nu. of 0.21.
[0624] A N.sub.2 injection test of the FBV 5 well was conducted to
determine a value for k.sub.a-WAG-inj. N.sub.2 stimulation
equipment was rigged up on the wellhead. A total of 293 Mscf
N.sub.2 was pumped into the well over 7.1 hours. Of this total 245
Mscf entered the coal seam and 48 Mscf remained in the wellbore.
The injection pressure at the end of the test was 2,262 psia. The
N.sub.2 was contained within an areal extent of 0.217 acres. If the
area was circular, the outer edge of the swept region was 54.9 feet
from the well. The FBV 5 well was shut-in to conduct a falloff test
and remained shut-in for nine days.
[0625] The injection data were evaluated to determine estimates of
the effective permeability to gas at the WAG injection pressure,
k.sub.eg-WAG-inj, which was 3.9 md. As previously discussed, gas
injection has little effect upon the effective permeability to
water. As a result, the effective permeability to water at the WAG
injection pressure, k.sub.ew-WAG-inj was the same as obtained from
the preceding water falloff test (k.sub.ew-i=0.73 md). The
resulting k.sub.eg-WAG-inj/k.sub.ew-WAG-inj ratio was therefore
5.3. Interpolation of Table 2 above resulted in estimates of the
WAG injection water saturation, S.sub.w-WAG-inj, the relative
permeability to gas at the WAG injection pressure,
k.sub.rg-WAG-inj, and the relative permeability to water at the WAG
injection pressure, k.sub.rw-WAG-inj, equal to 0.415, 0.282, and
0.054, respectively. Dividing k.sub.eg-WAG-inj, by k.sub.rg-WAG-inj
resulted in an estimated k.sub.a-WAG-inj equal to 13.8 md.
[0626] The FBV 5 well was returned to production for nine days. Gas
and water rates at the end of the production period were 4.1 Mscf/D
and 7.9 STB/D, respectively, which were very similar to the
production rates before N.sub.2 injection, indicating that N.sub.2
injection did not significantly change P.sub.R, effective
permeability to gas and water, or S.sub.w around the wellbore. The
FBV 5 post-WAG injection produced gas composition at the beginning
of the production period contained 30 mol. % CH.sub.4 and 70 mol. %
N.sub.2. This composition was assumed to be the same as that for
the in-situ gas at the end of the injection, the time of the
injection pressure measurement.
[0627] Calibrating the Model
[0628] The FBV 4A-SAG and the FBV 5-WAG tests resulted in
sufficient data to calibrate the inventors' model. Table 4
summarizes the parameter estimates discussed above. These values
were maintained constant during the calibration procedure. As
discussed below, porosity estimates were independently obtained for
FBV 4A and FBV 5 before injection with reservoir simulation methods
and were not changed during the calibration procedure. The SPS
porosity estimate after CO.sub.2 injection was determined using the
FBV 4A absolute permeability ratio before and after CO.sub.2
injection in Equation (20). And the SPS porosity estimate during
N.sub.2 injection was determined using the FBV 5 absolute
permeability ratio before and during N.sub.2 injection in Equation
(20). These SPS porosity estimates were maintained constant during
calibration.
9TABLE 4 FBV 4A: FBV 4A: FBV 5: FBV 5: FBV 5: Before CO.sub.2 After
CO.sub.2 Before N.sub.2 During H.sub.2O During N.sub.2 Parameter
Units Injection Injection Injection Injection Injection P.sub.R
psia 1,146 1,146 1,146 1,146 1,146 p.sub.inj psia -- -- -- 1,943
2,262 {overscore (p)}.sub.inj psia -- -- -- 1,545 1,704 .phi. --
0.002 0.00129 0.0012 0.0022 0.0027 k.sub.a md 3.66 0.98 1.204 7.43
13.8 k.sub.eg md 0.529 0.17 0.019 0.074 3.9 k.sub.ew md 0.573 0.12
0.73 5.45 0.730 S.sub.w -- 0.6043 0.5613 0.9101 0.9511 0.4151
k.sub.rg -- 0.1445 0.1725 0.0158 0.01 0.2823 k.sub.rw -- 0.1580
0.1246 0.628 0.733 0.0544
[0629] The other known data include the free gas composition for
each test condition. These data were used to estimate the sorbed
gas composition for each test condition based upon the sorption
isotherm parameters and were performed with extended Langmuir
isotherm theory using Equations (17), (18), and (19). For
simplicity, the gas composition was limited to three components,
CH.sub.4, N.sub.2, and CO.sub.2. The heavier hydrocarbons were
accounted for by adding to the CO.sub.2 value. This simplification
had little effect upon the calculations because the hydrocarbons
are also SAGs and were present in only small concentrations. Table
5 summarizes the free and sorbed gas compositions.
10TABLE 5 FBV 4A FBV 4A FBV 5 FBV 5 Before CO.sub.2 After CO.sub.2
Before N.sub.2 During N.sub.2 Parameter Injection Injection
Injection Injection Free Gas Composition (mole frac.) CH.sub.4
Concentration 0.9442 0.6230 0.9442 0.3000 CO.sub.2 Concentration
0.0212 0.3520 0.0212 0.0000 N.sub.2 Concentration 0.0346 0.0250
0.0346 0.7000 Sorbed Gas Composition (mole frac.) CH.sub.4
Concentration 0.8932 0.2591 0.8932 0.7152 CO.sub.2 Concentration
0.1012 0.7391 0.1012 0.0000 N.sub.2 Concentration 0.0056 0.0018
0.0056 0.2848
[0630] An estimate of the SPS porosity at initial pressure, .phi.,
for the coal surrounding the FBV 4A well was obtained by reservoir
simulation using the GEM.TM. (Version 2002.10) CBM software
available from Computer Modeling Group, Calgary, Alberta, Canada. A
simulation model was constructed that honored all well test
analysis results, sorption isotherm data, and gas composition data.
The SPS porosity included in the simulation model was adjusted to
obtain a match with water production rates. The SPS porosity and
absolute permeability were constant over the short duration of the
simulated production period. The resulting estimate for the FBV 4A
.phi..sub.i was 0.002, i.e., 0.2% of the bulk volume of the
reservoir.
[0631] Likewise, GEM.TM. was used to determine an estimate for
.phi..sub.i for the coal surrounding the FBV 5 well. The SPS
porosity included in the model was revised to obtain a match with
water production rates. The resulting estimate for the FBV 5
.phi..sub.i was 0.0012, i.e., 0.12% of the bulk volume of the
reservoir. The FBV 4A and FBV 5 .phi..sub.i estimates were used for
calibrating the inventors' model in Equation (1).
[0632] As discussed earlier, the water injection test conducted in
FBV 5A was used to calibrate the constrained axial modulus, M,
value used in the model to 397,600 psi . The sorption strain
calibration is affected by the value of Poisson's Ratio, .nu., as
will be shown in Example 3. Independent estimates of Young's
Modulus, E, and Poisson's Ratio, .nu., for Upper Medicine River
coal samples are unavailable to the inventors' knowledge. As a
result, the inventors used a .nu. value measured on San Juan Basin
coal samples from SPE 39105 (Mavor et al., ibid) of 0.21, resulting
in an estimate for E equal to 353,210 psi. The bulk modulus, K,
calculated using Equation (16) was 202,994 psi. The rock mechanical
properties, the porosity estimates and the test SPS pressures at
either the reservoir pressure or the average pressure of the
injection zone were used in Equation (21), resulting in a total
multicomponent volumetric sorption strain difference of -0.001448
between the FBV 4A tests after and before CO.sub.2 injection and
0.000211 between the FBV 5 tests during and before the N.sub.2
injection.
[0633] The parameters that were expected to be changed while
calibrating the model were the characteristic volumetric sorption
strain at infinite pressure, .epsilon..sub..infin.-CH4, for
CH.sub.4, and the pressures at 50% .epsilon..sub..infin.i,
p.sub..epsilon.i, for each gas component. An initial value of
.epsilon..sub..infin.-CH4=0.01 was selected for the CH.sub.4
characteristic sorption strain parameter, similar to that published
by Levine (ibid).
[0634] An average of the p.sub..epsilon.i values for CH.sub.4 (705
psia) and CO.sub.2 (386 psia) published by Levine (ibid) were used
as initial estimates. In general p.sub..epsilon.i values for
N.sub.2 are expected to be greater than for CH.sub.4 based upon
sorption isotherm data. Accordingly, P.sub..epsilon.-N2 was assumed
to be 1,200 psia. Once the p.sub..epsilon.i values were specified,
the characteristic volumetric sorption strain parameter for
CO.sub.2, .epsilon..sub..infin.-CO.sub..sub- .2=0.01117, was
computed with Equation (22) and the characteristic sorption strain
parameter for N.sub.2, .epsilon..sub.28 -N.sub..sub.2=0.00592 was
computed with Equation (23).
[0635] The values in Tables 4 and 5, and the estimated values for
E, .nu., .epsilon..sub..infin., p.sub..epsilon., and .phi.0 were
used in Equation (1) to produce values for .phi..sub.atm for
initial, WAG injection and SAG production conditions. Values for
k.sub.a-atm for each condition were also calculated using Equation
(2) with the respective .phi..sub.atm value and the k.sub.a value
from Table 4. The results for the first iteration are presented in
Table 6.
11TABLE 6 FBV 4A: Before FBV 4A: After CO.sub.2 FBV 5: Before FBV
5: During Parameter Units CO.sub.2 Injection Injection N.sub.2
Injection N.sub.2 Injection Pressure psia 1,146 1,146 1,146 1,704
.phi. at Pressure -- 0.002 0.00129 0.0012 0.0027
.phi./.phi..sub.atm ratio -- 0.8998 0.5983 0.8434 1.8653
.phi..sub.atm -- 0.00222 0.002158 0.001423 0.01451 k.sub.a-atm md
5.03 4.60 2.01 2.13
[0636] As shown in Table 6, the values for .phi..sub.atm for each
test condition were within 2 to 3% of each other and the values for
k.sub.a-atm for each test condition were within 6 to 9% of each
other. Accordingly, the estimated values for
.epsilon..sub..infin.-CH4 and p.sub..epsilon.i values were adjusted
iteratively in the manner described above under "Selecting Sorption
Strain & SPS Porosity Values." The inventors used a
Microsoft.RTM. Excel.TM. spreadsheet to assist in the iterative
computation. The iteration continued until substantially equal
values for .phi..sub.atm and k.sub.a-atm were independently
obtained for each of the test conditions. .phi..sub.atm values were
within 1% or less and k.sub.a-atm values were within 3% or
less.
[0637] Table 7 lists the ultimate estimates for strain parameters
used in the final iteration, while Table 8 summarizes estimates for
.phi., .phi..sub.atm and k.sub.a-atm based upon E and .nu. values
of 353,210 psi and 0.21, respectively.
12TABLE 7 Parameter Units CH.sub.4 CO.sub.2 N.sub.2 Strain at
Infinite Pressure, .epsilon..sub..infin.i -- 0.013 0.01593 0.00774
Pressure at 0.5 Infinite Strain, p.sub..epsilon.i psia 600 550
750
[0638]
13TABLE 8 FBV 4A: Before FBV 4A: After CO.sub.2 FBV 5: Before FBV
5: During Parameter Units CO.sub.2 Injection Injection N.sub.2
Injection N.sub.2 Injection Pressure psia 1,146 1,146 1,146 1,704
.phi. at Pressure -- 0.002 0.00129 0.0012 0.0027
.phi./.phi..sub.atm ratio 0.6095 0.3975 0.4836 1.0790 .phi..sub.atm
-- 0.003282 0.003249 0.002482 0.002509 k.sub.a-atm md 16.17 15.69
10.64 11.00
[0639] Once the .phi..sub.atm and k.sub.a-atm estimates were
obtained, the values were used in Equations (1) and (2) to
determine .phi. and k.sub.a values at pressures greater than
atmospheric pressure. FIGS. 5 and 6 illustrate the calibrated
absolute permeability and porosity estimates for the two FBV 4A and
the two FBV 5 gas compositions, respectively. The .phi..sub.atm and
k.sub.a-atm values were substantially equal for each test condition
at atmospheric pressure. However, as pressure increased, the values
for .phi. and k.sub.a differed for the different fluid compositions
due to differing sorption strain relationships. The pressure strain
relationship was the same for both SAG and WAG cases as it is
independent of gas composition.
[0640] Although the Table 7 values for .epsilon..sub..infin.i were
similar, there was a dramatic difference between the sorption
strain relationships for each gas component. FIG. 7 illustrates
these relationships. As expected, the sorption strain magnitude
corresponds to the sorptive nature of the gas, i.e. the SAG,
CO.sub.2, caused the greatest sorption strain, the WAG, N.sub.2,
caused the least, and CH.sub.4 sorption strain was
intermediate.
[0641] Once the model was calibrated, values for S.sub.w were
determined as a function of pressure. First, S.sub.w-atm was
determined using Equation (29). Specifically, S.sub.w-atm for FBV
4A was S.sub.w-i (0.60) multiplied by the porosity ratio in Table 8
(0.5463). The resulting estimate of S.sub.w-atm was 0.327. Using
the same calculation method, the corresponding S.sub.w-atm value
for the FBV 5 data was 0.382.
[0642] Once the porosity and absolute permeability at atmospheric
pressure were known, the porosity and absolute permeability at
other pressures or gas compositions could be computed with
Equations (1), (2), (4) and (5). S.sub.w at other pressures and
compositions could be computed with Equation (30).
[0643] Estimates of the relative permeability to gas and water as a
function of pressure were determined by interpolation in Table 2,
i.e., S.sub.w dictated k.sub.rg and k.sub.rw. The effective
permeability to gas and water were determined as a function of
pressure and gas composition by multiplying the absolute
permeability by the relative permeability values. FIG. 2
illustrates the relationship between permeability vs. pressure for
the FBV 4A gas composition before CO.sub.2 injection. FIG. 3
illustrates the water saturation and relative permeability to gas
and water vs. pressure for the same composition.
EXAMPLE 2
[0644] Example 2 illustrates how the inventors' model can be used
to predict injection rates for a desired fluid composition. After
the N.sub.2 injection test was completed in the FBV 5 well, a
simulated flue gas injection test was required. During this test a
50% CO.sub.2-50% N.sub.2 mixture was planned to be injected at
pressures up to 2,500 psia. Accordingly, an estimate of the maximum
possible injection rate was required.
[0645] From experience, it was known that the in-situ gas
composition after injection would not be the same as the injected
gas composition because CBM would be desorbed and mixed with the
injected gases. Also, SAG would be sorbed in the coal matrix.
Therefore, for the purposes of design, the free gas composition
after injection was assumed to be approximately 45 mol. % CH.sub.4,
45 mol. % CO.sub.2, and 10 mol. % N.sub.2.
[0646] Based on the expected free gas composition, the sorbed gas
composition was computed using Equations (17), (18), and (19) to be
16.4 mol. % CH.sub.4, 83.0 mol. % CO.sub.2, and 0.6 mol. % N.sub.2.
For this sorbed gas composition, Equations (4) and (5) were used to
estimate .epsilon. at atmospheric pressure and at 2,000 psia, the
pressure within the region affected by injection. These estimates
were 3.96(10.sup.-4) and 1.207(10.sup.-2), respectively. The
.epsilon. values were used in Equation (1) with the .phi..sub.atm
(0.002482) computed in Example 1 to calculate .phi./.phi..sub.atm
at 2,000 psia, which was 0.7094. The corresponding
k.sub.a/k.sub.a-atm ratio was 0.3571. Then, using the
k.sub.a/k.sub.a-atm ratio and k.sub.a-atm (10.64) from Example 1, a
value of 3.80 md was calculated for k.sub.a at 2,000 psia.
[0647] The .phi./.phi..sub.atm ratio was also used in Equation (30)
to calculate S.sub.w at 2,000 psia. Specifically, S.sub.w at 2,000
psia was S.sub.w-atm (0.4401) divided by .phi./.phi..sub.atm
(0.7094), resulting in an estimate of 0.6203. Interpolation in
Table 2 above resulted in an estimate for k.sub.rg of 0.1352.
Therefore, k.sub.eg at 2,000 psia during injection was estimated to
be about 0.513 md.
[0648] The injection rate for the proposed gas composition was then
predicted using Equation (33), using the calculated values for
k.sub.eg (0.513 md). To make the flow rate calculations, additional
information was required. The thickness was 13 feet. T.sub.R was
117.degree. F. The skin factor, s, caused by injection was often
about -4 based upon the inventors' experience. The geometrical term
in Equation (27) was 8.07 for a drainage area of 200 acres and a
wellbore radius of 0.25 feet. The real gas potential, m(p), at
T.sub.R and P.sub.R was calculated using Equation (28), resulting
in a value of 7.281(10.sup.7) psia.sup.2/cp. And, at 2,500 psia and
T.sub.R, m(p) was 3.179(10.sup.8) psia.sup.2/cp. Substituting these
values into Equation (33) resulted in an estimated injection rate
of 489 Mscf/D corresponding to 340 scf/min for injecting the
proposed gas mixture at 2,500 psia.
[0649] Accordingly, Example 2 illustrated how the inventors' model
can be used to predict injection rates for a desired fluid
composition.
EXAMPLE 3
[0650] This example demonstrates the sensitivity of the inventors'
model to rock mechanical properties. Specifically, this example
shows the effect of changing values for rock mechanical properties
on the .phi..sub.atm and k.sub.a-atm values determined in Example
1. As demonstrated below, accuracy in predicting .phi. and k.sub.a
using the inventors' model is improved with more accurate rock
mechanical property values. Accordingly, rock mechanical properties
are preferably determined from water injection test data.
[0651] As discussed in Example 1, the inventors used data measured
during a water injection test to calibrate for M. A value for v
based on San Juan Basin coal samples (Mavor et al., SPE 39105,
ibid) was used to estimate a value for Young's modulus, E.
Accordingly, the values used in calibrating the model in Example 1
were 353,210 psi for E, 0.21 for .nu., 397,600 for M and 202,994
psi for the bulk modulus, K
[0652] In contrast, Palmer and Mansoori ("P&M," SPE 36737 and
SPE 52607, ibid) reported that E can range from 124,000 to 445,000
psi for the San Juan Basin Reservoir. The P&M data value for
.nu. was 0.39, significantly greater than the Mavor et al. data.
The effect of E and v on values for M, K, 1/M, and (1-K/M), used in
the inventors' model, is compared for Example 1, the upper and
lower limits for the P&M E range and the midpoint of the
P&M E range.
14 TABLE 9 Example 1 Palmer & Mansoori Values Parameter Values
Lower Limit Midpoint Upper Limit E (psi) 3.53(10.sup.5)
1.24(10.sup.5) 2.85(10.sup.5) 4.45(10.sup.5) v (-) 0.21 0.39 0.39
0.39 M (psi) 3.98(10.sup.5) 2.47(10.sup.5) 5.68(10.sup.5)
8.88(10.sup.5) K (psi) 2.03(10.sup.5) 1.88(10.sup.5) 4.32(10.sup.5)
6.74(10.sup.5) 1/M (psi.sup.-1) .sup. 2.51(10.sup.-6) .sup.
4.04(10.sup.-6) .sup. 1.76(10.sup.-6) .sup. 1.13(10.sup.-6) 1-K/M
(-) 0.4895 0.2404 0.2404 0.2404
[0653] The 1/M value in Table 9is a multiplier in the dynamic
pressure strain component of the inventors' model, while the
(1-K/M) value is a multiplier in the dynamic sorption strain
component of the inventors' model.
[0654] The 1/M values for the P&M E range were 1.6 to 0.45
times the 1/M value for Example 1. Accordingly, P&M's E and v
values affect the dynamic pressure strain component by 1.6 to 0.45
times, as compared to those in Example 1.
[0655] And, with respect to the dynamic sorption strain component
of the inventors' model, the P&M E and .nu. values resulted in
a (1-K/M) value about 50% less than the (1-K/M) value for Example
1. This difference causes the .epsilon..sub..infin. value for
CH.sub.4 and CO.sub.2 to be roughly twice those of Example 1. The
.epsilon..sub..infin.-N2 values and p.sub..epsilon.i values for all
gases were adjusted as necessary to obtain a match subject to the
constraints discussed earlier.
[0656] Table 10 compares the .phi..sub.atm and k.sub.a-atm values
for Example 1 to values obtained using P&M's E and .nu. values
for their midpoint and upper limit values. It was not possible to
obtain reasonable .phi..sub.atm and k.sub.a-atm values for
P&M's lower or upper limit E value as the N.sub.2 injection
test could not be matched with ranges of N.sub.2 strain parameters
that met the inventors' criteria for reasonableness. The
.phi..sub.atm and k.sub.a-atm values were greater for P&M's
midpoint E value and their higher .nu. value
15TABLE 10 FBV 4A: Before FBV 4A: After FBV 5: Before N.sub.2 FBV
5: During N.sub.2 Parameter Units CO.sub.2 Injection CO.sub.2
Injection Injection Injection Pressure psia 1,146 1,146 1,146 2,262
.phi. at Pressure -- 0.002 0.001 0.0012 0.0027 Example 1 Values E =
3.53(10.sup.5), .nu. = 0.21 .phi..sub.atm -- 0.003282 0.003249
0.002482 0.002509 k.sub.a-atm md 16.2 15.7 10.6 11.0 Palmer &
Mansoori's Midpoint E = 2.85(10.sup.5), .nu. = 0.39 .phi..sub.atm
-- 0.00332 0.00330 0.00252 0.00254 k.sub.a-atm md 16.8 16.4 11.2
11.4
[0657] The range in rock mechanical properties affected the
characteristic strain parameters as indicated in Table 11. Use of
the E and .nu. values reported by Palmer and Mansoori resulted in
.epsilon..sub..infin.j values that were substantially greater than
those reported by Levine due to the use of the high .nu. value.
16TABLE 11 Parameter Units CH.sub.4 CO.sub.2 N.sub.2 Example 1
Strain at Infinite Pressure, .epsilon..sub..infin. -- 0.013 0.0159
0.00774 Pressure at 0.5 Infinite Strain, psia 600 550 750
p.sub..epsilon. Palmer & Mansoori's Midpoint E =
2.85(10.sup.5), .nu. = 0.39 Strain at Infinite Pressure,
.epsilon..sub..infin. -- 0.02053 0.02736 0.02040 Pressure at 0.5
Infinite Strain, psia 600 550 750 p.sub..epsilon.
[0658] This comparison indicates that the estimates of the strain
parameters and the rock mechanics properties are highly
interrelated. Accordingly, rock mechanical properties are
preferably measured as accurately as possible for determining
.phi..sub.atm and k.sub.a-atm.
EXAMPLE 4
[0659] The SPS porosity estimate has an impact on the calibration
process as evidenced by this example that investigates the
calibration results if the SPS porosity before CO.sub.2 injection
for the FBV 4A well and the SPS porosity before N.sub.2 injection
for the FBV 5 well were assumed to be half the original
estimates.
[0660] Reducing the SPS porosity for FBV 5 (before N.sub.2
injection) by a factor of two, increases the calibrated M value
determined from the FBV 5 water injection test by a factor of two
to 795,200 psi. Therefore, based upon a value for .nu. of 0.21, the
estimate for E was equal to 706,400 psi.
[0661] The use of a smaller SPS porosity value has a substantial
effect upon the estimates of k.sub.a-atm as summarized in Table 12.
The estimates of k.sub.a-atm are approximately 11 to 18 times
greater for the lower SPS porosity case than for Example 1. This
comparison demonstrates the benefit of estimating SPS porosity from
water production rather than arbitrarily assuming values.
17TABLE 12 FBV 4A: Before FBV 4A: After FBV 5: Before FBV 5: During
Parameter Units CO.sub.2 Injection CO.sub.2 Injection N.sub.2
Injection N.sub.2 Injection SPS Pressure psia 1,146 1,146 1,146
2,262 .phi. at Pressure -- 0.002 0.001 0.0012 0.0027 Example 1
Values E = 3.53(10.sup.5), .nu. = 0.21 .phi., -- 0.0020 0.001291
0.0012 0.00207 .phi..sub.atm -- 0.003282 0.003249 0.002482 0.002509
k.sub.a-atm md 16.2 15.7 10.6 11.0 E = 7.06(10.sup.5), .nu. = 0.21
with reduced porosity .phi., -- 0.0010 0.000646 0.00060 0.001353
.phi..sub.atm -- 0.003647 0.003628 0.003247 0.003273 k.sub.a-atm md
177.6 174.9 190.8 195.3
[0662] The reduction in SPS porosity resulted in the same sorption
strain parameters as for Example 1 as summarized in Table 11. This
comparison indicates that calibration of the rock mechanical
properties with water injection test data reduces the potential
variation in the sorption strain parameters.
[0663] Preferred processes for practicing the invention have been
described. It will be understood that the foregoing is illustrative
only and that other embodiments of the process can be employed
without departing from the true scope of the invention defined in
the following claims.
[0664] For convenience, the nomenclature used in the Detailed
Description and claims is summarized in Table 13.
18TABLE 13 Description, Units Symbol SPS = Secondary Porosity
System Equation # .alpha. grain thermal expansitivity, .degree.
F..sup.-1 9 .epsilon. total multicomponent volumetric sorption
strain at SPS pressure, 1, 5 dimensionless .epsilon..sub.atm total
multicomponent volumetric sorption strain at atmospheric pressure,
1 dimensionless .epsilon..sub.CH4 volumetric sorption strain of
CH.sub.4, dimensionless .epsilon..sub.i volumetric sorption strain
for component i in a multicomponent gas, 4, 5 dimensionless
.epsilon..sub.L volumetric sorption strain at infinite pressure,
dimensionless .epsilon..sub..infin.i characteristic volumetric
sorption strain at infinite pressure for 4 component i in a
multicomponent gas, dimensionless .epsilon..sub..infin.s single
component characteristic volumetric sorption strain at infinite 3
pressure, dimensionless .epsilon..sub.s single component volumetric
sorption strain, dimensionless 3 .epsilon..sub.SAG volumetric
sorption strain of SAG, dimensionless .epsilon..sub.WAG volumetric
sorption strain of WAG, dimensionless .gamma. grain
compressibility, psi.sup.-1 9 .lambda..sub.T total mobility, md/cp
34 .mu..sub.g gas viscosity, cp 24, 28, 34 .mu..sub.w water
viscosity, cp 24, 34 .phi. SPS porosity at SPS pressure,
dimensionless 1, 2, 29, 30 .phi..sub.atm SPS porosity at
atmospheric pressure, dimensionless 1, 2, 29, 30 d.phi.
infinitesimal change in SPS porosity, dimensionless 9 {overscore
(.rho.)}.sub.c average coal seam density, g/cm.sup.3 10 .rho..sub.r
rock density, lbm/ft.sup.3 7 .sigma. total stress, psia 6
.sigma..sub.e effective stress, psia 6, 8 .sigma.'.sub..nu.
vertical stress gradient, psi/ft 7, 8 .nu. Poisson's ratio,
dimensionless 12, 16 A area, ft.sup.2 27 A.sub.inj area of sorbed
gas region, ft.sup.2 10, 11 a.sub.i-c pressure component of
sorption strain (i.e., strain contribution factor) for 22, 23
component i under test condition c B.sub.g gas formation volume
factor, in-situ gas volume/surface gas volume 24 B.sub.w water
formation volume factor, in-situ water volume/surface water 24
volume b poroelastic constant, dimensionless 6, 8 c number of tests
C.sub.A shape factor, dimensionless 27 E Young's modulus, psi 12 f
a fraction ranging from 0 to 1 (Palmer and Mansoori assumed 0.5) 9
G.sub.s total gas storage capacity, scf/ton 10, 18, 19 G'.sub.sL
multicomponent Langmuir storage capacity, dry, ash-free basis,
scf/ton G.sub.si storage capacity of component i in a
multicomponent gas, in-situ basis, 17, 18, 19 scf/ton G.sub.sLi
Langmuir storage capacity of component i in a multicomponent gas,
dry, 17 ash-free basis, scf/ton h coal thickness, feet 10, 25, 33 K
bulk modulus, psi 1, 9, 16 k permeability, md 26 k.sub.a absolute
permeability at SPS pressure, md 2, 31, 32, 34 k.sub.a-atm absolute
permeability at atmospheric pressure, md 2 k.sub.a-i initial
absolute permeability, at reservoir pressure, md k.sub.a-H2O-inj
absolute permeability at a water injection pressure, md
k.sub.a-WAG-inj WAG injection absolute permeability at a WAG
injection pressure, md k.sub.a-SAG-p SAG production absolute
permeability at a SAG production pressure, md k.sub.e effective
permeability, md k.sub.eg effective permeability to gas, md 24, 25,
32, 33 k.sub.eg-atm effective permeability to gas at atmospheric
pressure, md k.sub.eg-i initial effective permeability to gas, md
k.sub.eg-SAG-p effective permeability to gas at SAG production
pressure, md k.sub.eg-WAG-inj effective permeability to gas at WAG
injection pressure, md k.sub.ew effective permeability to water, md
24, 32 k.sub.ew-atm effective permeability to water at atmospheric
pressure, md k.sub.ew-i initial effective permeability to water, md
k.sub.ew-H2O-inj effective permeability to water at water injection
pressure, md k.sub.ew-SAG-p effective permeability to water at SAG
production pressure, md k.sub.ew-WAG-inj effective permeability to
water at WAG injection pressure, md k.sub.m modified permeability,
md 26 k.sub.r relative permeability, dimensionless k.sub.rg
relative permeability to gas, dimensionless 24, 31, 33 k.sub.rg-atm
relative permeability to gas at the water saturation at atmospheric
pressure, dimensionless k.sub.rg-i initial relative permeability to
gas, dimensionless k.sub.rg-SAG-p relative permeability to gas at
SAG production pressure, dimensionless k.sub.rg-WAG-inj relative
permeability to gas at WAG injection pressure, dimensionless
k.sub.rw relative permeability to water, dimensionless 24, 32, 34
k.sub.rw-atm relative permeability to water at the water saturation
at atmospheric pressure, dimensionless k.sub.rw-i initial relative
permeability to water, dimensionless k.sub.rw-H2O-inj relative
permeability to water at water injection pressure, dimensionless
k.sub.rw-SAG-p relative permeability to water at SAG production
pressure, dimensionless k.sub.rw-WAG-inj relative permeability to
water at WAG injection pressure, dimensionless n number of
components in multicomponent gas 4, 5, 17 M constrained axial
modulus, psi 1, 9, 12, 16 m(p) real gas potential, psia.sup.2/cp
25, 28, 33 p SPS pressure, psia 1, 3, 4, 6, 8, 17, 28 dP
infinitesimal change in SPS pressure, psi 9 p.sub..epsilon.
characteristic pressure at a strain of 0.5.epsilon..sub..infin.,
psia p.sub..epsilon.s single component characteristic pressure at a
sorption strain of 0.5.epsilon..sub..infin., 3 psia
p.sub..epsilon.i, p.sub..epsilon.j characteristic pressures at a
sorption strain of 0.5 .epsilon..sub..infin., for components i 4
and j, respectively, in a multicomponent gas, psia p.sub.atm
atmospheric pressure, psia 1 P.sub.E fracture extension pressure,
psia P.sub.F fracture pressure, psia p.sub.H2O-inj water injection
pressure, psia p.sub.Li, p.sub.Lj Langmuir pressures for component
i and j, respectively, in a 17 multicomponent gas, psia p.sub.SAG-p
SAG production pressure, psia p.sub.WAG-inj WAG injection pressure,
psia P.sub.R reservoir pressure, psia 25 p.sub.sc pressure at
standard conditions, 14.69 psia 25, 33 P.sub.w bottom-hole
pressure, psia 25 q.sub.g gas production rate at standard
conditions, Mscf/D 24, 25, 33 q.sub.w water production rate, STB/D
24 r.sub.d equivalent steady-stage drainage radius, feet 25, 27, 33
r.sub.inj gas penetration distance from the wellbore for circular
injection area, 10 feet r.sub.m modified region radius, feet 26
r.sub.w wellbore radius, feet 25, 26, 27, 33 S skin factor,
dimensionless 25, 26, 33 S.sub.w water saturation, dimensionless 30
S.sub.w-atm water saturation at atmospheric pressure, dimensionless
29, 30 S.sub.w-i initial water saturation, dimensionless 29
S.sub.w-SAG-p water saturation at SAG production pressure,
dimensionless S.sub.w-WAG-inj water saturation at WAG injection
pressure, dimensionless T.sub.R reservoir temperature, .degree. R
25, 33 dT.sub.R infinitesimal change in reservoir temperature,
.degree. R 9 T.sub.sc temperature at standard conditions,
519.67.degree. R (60.degree. F.) 25, 33 t.sub.s sorption time, days
t.sub.S-CBM sorption time for original in-situ CBM at reservoir
temperature, days t.sub.S-SAG sorption time for SAG at reservoir
temperature, days V.sub.inj volume of injected gas, scf 10 V.sub.p
pore volume, ft.sup.3 V.sub.w water volume in SPS, ft.sup.3 w.sub.a
ash content, weight fraction 17 w.sub.we equilibrium moisture
content, weight fraction 17 x.sub.i, x.sub.j mole fractions of
component i and j, respectively, in the sorbed gas 4, 19 phase,
dimensionless y.sub.i, y.sub.j mole fractions of component i and j,
respectively, in the free gas phase, 17 dimensionless z depth, feet
7, 8 dz infinitesimal change in depth, feet 7 z.sub.g real gas
deviation factor, dimensionless 28
* * * * *